Working on Chapter 3
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@ -27,7 +27,11 @@ general Hamiltonian that describes the coupling of atoms with
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far-detuned optical beams \cite{mekhov2012}. This will serve as the
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basis from which we explore the system in different parameter regimes,
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such as nondestructive measurement in free space or quantum
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measurement backaction in a cavity.
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measurement backaction in a cavity. Another interesting direction for
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this field of research are quantum optical lattices where the trapping
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potential is treated quantum mechanically. However this is beyond the
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scope of this work.
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\mynote{insert our paper citations here}
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We consider $N$ two-level atoms in an optical lattice with $M$
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sites. For simplicity we will restrict our attention to spinless
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@ -43,14 +47,10 @@ capable of describing a range of different experimental setups ranging
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from a small number of sites with a large filling factor (e.g.~BECs
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trapped in a double-well potential) to a an extended multi-site
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lattice with a low filling factor (e.g.~a system with one atom per
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site will exhibit the Mott insulator to superfluid quantum phase
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site which will exhibit the Mott insulator to superfluid quantum phase
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transition). \mynote{extra fermion citations, Piazza? Look up Gabi's
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AF paper.}
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\mynote{Potentially some more crap, but come to think of it the
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content will strongly depend on what was included in the preceding
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section on plain ultracold bosons}
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As we have seen in the previous section, an optical lattice can be
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formed with classical light beams that form standing waves. Depending
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on the detuning with respect to the atomic resonance, the nodes or
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@ -83,9 +83,9 @@ For simplicity, we will be considering one-dimensional lattices most
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of the time. However, the model itself is derived for any number of
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dimensions and since none of our arguments will ever rely on
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dimensionality our results straightforwardly generalise to 2- and 3-D
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systems. This simplification allows us to present a much simpler
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picture of the physical setup where we only need to concern ourselves
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with a single angle for each optical mode. As shown in
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systems. This simplification allows us to present a much more
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intuitive picture of the physical setup where we only need to concern
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ourselves with a single angle for each optical mode. As shown in
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Fig. \ref{fig:LatticeDiagram} the angle between the normal to the
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lattice and the probe and detected beam are denoted by $\theta_0$ and
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$\theta_1$ respectively. We will consider these angles to be tunable
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@ -199,11 +199,11 @@ equation for the lowering operator
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Therefore, by inserting this expression into the Heisenberg equation
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for the light mode $m$ given by
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\begin{equation}
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\dot{\a}_m = - \sigma^- g^*_m u^*_m(\b{r})
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\dot{\a}_m = - \sigma^- g_m u^*_m(\b{r})
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\end{equation}
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we get the following equation of motion
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\begin{equation}
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\dot{\a}_m = \frac{i}{\Delta_a} \sum_l g_l g^*_m u_l(\b{r})
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\dot{\a}_m = \frac{i}{\Delta_a} \sum_l g_l g_m u_l(\b{r})
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u^*_m(\b{r}) \a_l.
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\end{equation}
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An effective Hamiltonian which results in the same optical equations
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@ -311,30 +311,49 @@ This contribution can be separated into two parts, one which couples
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directly to the on-site atomic density and one that couples to the
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tunnelling operators. We will define the operator
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\begin{equation}
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\label{eq:F}
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\hat{F}_{l,m} = \hat{D}_{l,m} + \hat{B}_{l,m},
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\end{equation}
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where $\hat{D}_{l,m}$ is the direct coupling to atomic density
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\begin{equation}
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\label{eq:D}
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\hat{D}_{l,m} = \sum_{i}^K J^{l,m}_{i,i} \hat{n}_i,
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\end{equation}
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and $\hat{B}_{l,m}$ couples to the matter-field via the
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nearest-neighbour tunnelling operators
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\begin{equation}
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\label{eq:B}
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\hat{B}_{l,m} = \sum_{\langle i, j \rangle}^K J^{l,m}_{i,j} \bd_i b_j,
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\end{equation}
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and we neglect couplings beyond nearest neighbours for the same reason
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as before when deriving the matter Hamiltonian.
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where $K$ denotes a sum over the illuminated sites and we neglect
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couplings beyond nearest neighbours for the same reason as before when
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deriving the matter Hamiltonian.
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\mynote{make sure all group papers are cited here} These equations
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encapsulate the simplicity and flexibility of the measurement scheme
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that we are proposing. The operators given above are entirely
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determined by the values of the $J^{l,m}_{i,j}$ coefficients and
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despite its simplicity, this is sufficient to give rise to a host of
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interesting phenomena via measurement back-action such as the
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generation of multipartite entangled spatial modes in an optical
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lattice \cite{elliott2015, atoms2015, mekhov2009pra}, the appearance
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of long-range correlated tunnelling capable of entangling distant
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lattice sites, and in the case of fermions, the break-up and
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protection of strongly interacting pairs \cite{mazzucchi2016,
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kozlowski2016zeno}. Additionally, these coefficients are easy to
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manipulate experimentally by adjusting the optical geometry via the
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light mode functions $u_l(\b{r})$.
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It is important to note that we are considering a situation where the
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contribution of quantized light is much weaker than that of the
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classical trapping potential. If that was not the case, it would be
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necessary to determine thw Wannier functions in a self-consistent way
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necessary to determine the Wannier functions in a self-consistent way
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which takes into account the depth of the quantum poterntial generated
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by the quantized light modes. This significantly complicates the
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treatment, but can lead to interesting physics. Amongst other things,
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the atomic tunnelling and interaction coefficients will now depend on
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the quantum state of light.
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\mynote{cite Santiago's papers and Maschler/Igor EPJD}
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the quantum state of light. \mynote{cite Santiago's papers and
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Maschler/Igor EPJD}
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Therefore, combining these final simplifications we finally arrive at
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our quantum light-matter Hamiltonian
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@ -346,18 +365,25 @@ our quantum light-matter Hamiltonian
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\end{equation}
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where we have phenomologically included the cavity decay rates
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$\kappa_l$ of the modes $a_l$. A crucial observation about the
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structure of this Hamiltonian is that in the last term, the light
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modes $a_l$ couple to the matter in a global way. Instead of
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structure of this Hamiltonian is that in the interaction term, the
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light modes $a_l$ couple to the matter in a global way. Instead of
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considering individual coupling to each site, the optical field
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couples to the global state of the atoms within the illuminated region
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via the operator $\hat{F}_{l,m}$. This will have important
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implications for the system and is one of the leading factors
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responsible for many-body behaviour beyong the Bose-Hubbard
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responsible for many-body behaviour beyond the Bose-Hubbard
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Hamiltonian paradigm.
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\subsection{Scattered light behaviour}
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Furthermore, it is also vital to note that light couples to the matter
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via an operator, namely $\hat{F}_{l,m}$, which makes it sensitive to
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the quantum state of matter. This is a key element of our treatment of
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the ultimate quantum regime of light-matter interaction that goes
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beyond previous treatments.
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Having derived the full quantum light-matter Hamiltonian we will no
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\subsection{Scattered light behaviour}
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\label{sec:a}
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Having derived the full quantum light-matter Hamiltonian we will now
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look at the behaviour of the scattered light. We begin by looking at
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the equations of motion in the Heisenberg picture
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\begin{equation}
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@ -391,6 +417,7 @@ pumping $\eta_l$. We also limit ourselves to only a single scattered
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mode, $a_1$. This leads to a simple linear relationship between the
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light mode and the atomic operator $\hat{F}_{1,0}$
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\begin{equation}
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\label{eq:a}
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\a_1 = \frac{U_{1,0} a_0} {\Delta_{p} + i \kappa} \hat{F} =
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C \hat{F},
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\end{equation}
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@ -400,19 +427,45 @@ cavity. Furthermore, since there is no longer any ambiguity in the
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indices $l$ and $m$, we have dropped indices on $\Delta_{1p} \equiv
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\Delta_p$, $\kappa_1 \equiv \kappa$, and $\hat{F}_{1,0} \equiv
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\hat{F}$. We also do the same for the operators $\hat{D}_{1,0} \equiv
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\hat{D}$ and $\hat{B}_{1,0} \equiv \hat{B}$.
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\hat{D}$, $\hat{B}_{1,0} \equiv \hat{B}$, and the coefficients
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$J^{1,0}_{i,j} \equiv J_{i,j}$.
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Whilst the light amplitude itself is only linear in atomic operators,
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we can easily have access to higher moments by simply simply
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considering higher moments of the $\a_1$ such as the photon number
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$\ad_1 \a_1$. Additionally, even though we only consider a single
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scattered mode, this model can be applied to free space by simply
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varying the direction of the scattered light mode if multiple
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scattering events can be neglected. This is likely to be the case
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since the interactions will be dominated by photons scattering from
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the much larger coherent probe.
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The operator $\a_1$ itself is not an observable. However, it is
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possible to combine the outgoing light field with a stronger local
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oscillator beam in order to measure the light quadrature
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\begin{equation}
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\hat{X}_\phi = \frac{1}{2} \left( \a_1 e^{-i \phi} + \ad_1 e^{i \phi} \right),
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\end{equation}
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which in turn can expressed via the quadrature of $\hat{F}$,
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$\hat{X}^F_\beta$, as
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\begin{equation}
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\hat{X}_\phi = |C| \hat{X}_\beta^F = \frac{|C|}{2} \left( \hat{F}
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e^{-i \beta} + \hat{F}^\dagger e^{i \beta} \right),
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\end{equation}
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where $\beta = \phi - \phi_C$, $C = |C| \exp(i \phi_C)$, and $\phi$ is
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the local oscillator phase.
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Whilst the light amplitude and the quadratures are only linear in
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atomic operators, we can easily have access to higher moments via
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related quantities such as the photon number
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$\ad_1 \a_1 = |C|^2 \hat{F}^\dagger \hat{F}$ or the quadrature
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variance
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\begin{equation}
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\label{eq:Xvar}
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( \Delta X_\phi )^2 = \langle \hat{X}_\phi^2 \rangle - \langle
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\hat{X}_\phi \rangle^2 = \frac{1}{4} + |C|^2 (\Delta X^F_\beta)^2,
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\end{equation}
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which reflect atomic correlations and fluctuations.
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Finally, even though we only consider a single scattered mode, this
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model can be applied to free space by simply varying the direction of
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the scattered light mode if multiple scattering events can be
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neglected. This is likely to be the case since the interactions will
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be dominated by photons scattering from the much larger coherent
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probe.
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\subsection{Density and Phase Observables}
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\label{sec:B}
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Light scatters due to its interactions with the dipole moment of the
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atoms which for off-resonant light, like the type that we consider,
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@ -430,21 +483,22 @@ condensates even though the two components have initially well-defined
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atom numbers which is phase's conjugate variable.
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In our model light couples to the operator $\hat{F}$ which consists of
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a density opertor part, $\hat{D} = \sum_i J_{i,i} \hat{n}_i$, and a
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phase operator part, $\hat{B} = \sum_{\langle i, j \rangle} J_{i,j}
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\bd_i b_j$. Most of the time the density component dominates, $\hat{D}
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\gg \hat{B}$, and thus $\hat{F} \approx \hat{D}$. However, it is
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possible to engineer an optical geometry in which $\hat{D} = 0$
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a density component, $\hat{D} = \sum_i J_{i,i} \hat{n}_i$, and a phase
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component, $\hat{B} = \sum_{\langle i, j \rangle} J_{i,j} \bd_i
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b_j$. In general, the density component dominates,
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$\hat{D} \gg \hat{B}$, and thus $\hat{F} \approx \hat{D}$. However,
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it is possible to engineer an optical geometry in which $\hat{D} = 0$
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leaving $\hat{B}$ as the dominant term in $\hat{F}$. This approach is
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fundamentally different from the aforementioned double-well proposals
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as it directly couples to the interference terms caused by atoms
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tunnelling rather than combining light scattered from different
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sources.
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For clarity we will consider a 1D lattice with lattice spacing $d$
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along the $x$-axis direction, but the results can be applied and
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generalised to higher dimensions. Central to engineering the $\hat{F}$
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operator are the coefficients $J_{i,j}$ given by
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For clarity we will consider a 1D lattice as shown in
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Fig. \ref{fig:LatticeDiagram} with lattice spacing $d$ along the
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$x$-axis direction, but the results can be applied and generalised to
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higher dimensions. Central to engineering the $\hat{F}$ operator are
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the coefficients $J_{i,j}$ given by
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\begin{equation}
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\label{eq:Jcoeff}
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J_{i,j} = \int \mathrm{d} x \,\,\, w(x - x_i) u_1^*(x) u_0(x) w(x - x_j).
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@ -453,156 +507,139 @@ The operators $\hat{B}$ and $\hat{D}$ depend on the values of
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$J_{i,i+1}$ and $J_{i,i}$ respectively. These coefficients are
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determined by the convolution of the coupling strength between the
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probe and scattered light modes, $u_1^*(x)u_0(x)$, with the relevant
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Wannier function overlap shown in Fig. \ref{fig:WannierOverlaps}. For
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Wannier function overlap shown in Fig. \ref{fig:WannierProducts}a. For
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the $\hat{B}$ operator we calculate the convolution with the nearest
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neighbour overlap, $W_1(x) \equiv w(x - d/2) w(x + d/2)$ shown in
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Fig. \ref{fig:WannierOverlaps}c, and for the $\hat{D}$ operator we
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calculate the convolution with the square of the Wannier function at a
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single site, $W_0(x) \equiv w^2(x)$ shown in
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Fig. \ref{fig:WannierOverlaps}b. Therefore, in order to enhance the
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$\hat{B}$ term we need to maximise the overlap between the light modes
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and the nearest neighbour Wannier overlap, $W_1(x)$. This can be
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achieved by concentrating the light between the sites rather than at
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the positions of the atoms. Ideally, one could measure between two
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sites similarly to single-site addressing, which would measure a
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single term $\langle \bd_i b_{i+1}+b_i \bd_{i+1}\rangle$, e.g.~by
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superposing a deeper optical lattice shifted by $d/2$ with respect to
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the original one, catching and measuring the atoms in the new lattice
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sites. A single-shot success rate of atom detection will be small. As
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single-site addressing is challenging, we proceed with the global
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scattering.
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neighbour overlap, $W_1(x) \equiv w(x - d/2) w(x + d/2)$, and for the
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$\hat{D}$ operator we calculate the convolution with the square of the
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Wannier function at a single site, $W_0(x) \equiv w^2(x)$. Therefore,
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in order to enhance the $\hat{B}$ term we need to maximise the overlap
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between the light modes and the nearest neighbour Wannier overlap,
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$W_1(x)$. This can be achieved by concentrating the light between the
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sites rather than at the positions of the atoms. Ideally, one could
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measure between two sites similarly to single-site addressing
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\cite{greiner2009, bloch2011}, which would measure a single term
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$\langle \bd_i b_{i+1}+b_i \bd_{i+1}\rangle$. This could be achieved,
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for example, by superposing a deeper optical lattice shifted by $d/2$
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with respect to the original one, catching and measuring the atoms in
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the new lattice sites. A single-shot success rate of atom detection
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will be small. As single-site addressing is challenging, we proceed
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with the global scattering.
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\mynote{Fix labels in this figure}
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\begin{figure}[htbp!]
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\centering
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\includegraphics[width=1.0\textwidth]{Wannier1}
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\includegraphics[width=1.0\textwidth]{Wannier2}
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\caption[Wannier Function Overlaps]{(a) The Wannier functions
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corresponding to four neighbouring sites in a 1D
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lattice. $\lambda$ is the wavelength of the trapping beams, thus
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lattice sites occur every $\lambda/2$. (Bottom Left) The square of
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a single Wannier function - this quantity is used when evaluating
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$\hat{D}$. It's much larger than the overlap between two
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neighbouring Wannier functions, but it is localised to the
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position of the lattice site it belongs to. (Bottom Right) The
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overlap of two neighbouring Wannier functions - this quantity is
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used when evaluating $\hat{B}$. It is much smaller than the square
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of a Wannier function, but since it's localised in between the
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sites, thus $\hat{B}$ can be maximised while $\hat{D}$ minimised
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by focusing the light in between the sites.}
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\label{fig:WannierOverlaps}
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\end{figure}
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\mynote{show the expansion into an FT}
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\mynote{Potentially expand details of the derivation of these equations}
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In order to calculate the $J_{i,j}$ coefficients we perform numerical
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calculations using realistic Wannier functions. However, it is
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possible to gain some analytic insight into the behaviour of these
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values by looking at the Fourier transforms of the Wannier function
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overlaps, $\mathcal{F}[W_{0,1}](k)$, shown in Fig.
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\ref{fig:WannierFT}b. This is because the light mode product,
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$u_1^*(x) u_0(x)$, can be in general decomposed into a sum of
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oscillating exponentials of the form $e^{i k x}$ making the integral
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in Eq. \eqref{eq:Jcoeff} a sum of Fourier transforms of
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$W_{0,1}(x)$. We consider both the detected and probe beam to be
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standing waves which gives the following expressions for the $\hat{D}$
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and $\hat{B}$ operators
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\begin{eqnarray}
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calculations using realistic Wannier functions
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\cite{walters2013}. However, it is possible to gain some analytic
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insight into the behaviour of these values by looking at the Fourier
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transforms of the Wannier function overlaps,
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$\mathcal{F}[W_{0,1}](k)$, shown in Fig.
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\ref{fig:WannierProducts}b. This is because the for plane and standing
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wave light modes the product $u_1^*(x) u_0(x)$ can be in general
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decomposed into a sum of oscillating exponentials of the form
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$e^{i k x}$ making the integral in Eq. \eqref{eq:Jcoeff} a sum of
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Fourier transforms of $W_{0,1}(x)$. We consider both the detected and
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probe beam to be standing waves which gives the following expressions
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for the $\hat{D}$ and $\hat{B}$ operators
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\begin{align}
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\label{eq:FTs}
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\hat{D} =
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\frac{1}{2}[\mathcal{F}[W_0](k_-)\sum_m\hat{n}_m\cos(k_- x_m
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+\varphi_-)
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\nonumber\\ +\mathcal{F}[W_0](k_+)\sum_m\hat{n}_m\cos(k_+
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x_m +\varphi_+)], \nonumber\\ \hat{B} =
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\frac{1}{2}[\mathcal{F}[W_1](k_-)\sum_m\hat{B}_m\cos(k_- x_m
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+\frac{k_-d}{2}+\varphi_-)
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\nonumber\\ +\mathcal{F}[W_1](k_+)\sum_m\hat{B}_m\cos(k_+
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x_m +\frac{k_+d}{2}+\varphi_+)],
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\end{eqnarray}
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where $k_\pm = k_{0x} \pm k_{1x}$, $k_{(0,1)x} = k_{0,1}
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\sin(\theta_{0,1}$), $\hat{B}_m=b^\dag_mb_{m+1}+b_mb^\dag_{m+1}$, and
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\hat{D} = & \frac{1}{2}[\mathcal{F}[W_0](k_-)\sum_m\hat{n}_m\cos(k_-
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x_m +\varphi_-) \nonumber\\
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& + \mathcal{F}[W_0](k_+)\sum_m\hat{n}_m\cos(k_+ x_m +\varphi_+)],
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\nonumber\\
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\hat{B} = & \frac{1}{2}[\mathcal{F}[W_1](k_-)\sum_m\hat{B}_m\cos(k_- x_m
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+\frac{k_-d}{2}+\varphi_-) \nonumber\\
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& +\mathcal{F}[W_1](k_+)\sum_m\hat{B}_m\cos(k_+
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x_m +\frac{k_+d}{2}+\varphi_+)],
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||||
\end{align}
|
||||
where $k_\pm = k_{0x} \pm k_{1x}$,
|
||||
$k_{(0,1)x} = k_{0,1} \sin(\theta_{0,1}$),
|
||||
$\hat{B}_m=b^\dag_mb_{m+1}+b_mb^\dag_{m+1}$, and
|
||||
$\varphi_\pm=\varphi_0 \pm \varphi_1$. The key result is that the
|
||||
$\hat{B}$ operator is phase shifted by $k_\pm d/2$ with respect to the
|
||||
$\hat{D}$ operator since it depends on the amplitude of light in
|
||||
between the lattice sites and not at the positions of the atoms,
|
||||
between the lattice sites and not at the positions of the atoms
|
||||
allowing to decouple them at specific angles.
|
||||
|
||||
\begin{figure}[htbp!]
|
||||
\begin{center}
|
||||
\includegraphics[width=\linewidth]{WF_S}
|
||||
\end{center}
|
||||
\caption[Wannier Function Fourier Transforms]{The Wannier function
|
||||
products: (a) $W_0(x)$ (solid line, right axis), $W_1(x)$ (dashed
|
||||
line, left axis) and their (b) Fourier transforms
|
||||
$\mathcal{F}[W_{0,1}]$. The Density $J_{i,i}$ and
|
||||
matter-interference $J_{i,i+1}$ coefficients in diffraction
|
||||
maximum (c) and minimum (d) as are shown as functions of standing
|
||||
wave shifts $\varphi$ or, if one were to measure the quadrature
|
||||
variance $(\Delta X^F_\beta)^2$, the local oscillator phase
|
||||
$\beta$. The black points indicate the positions, where light
|
||||
measures matter interference $\hat{B} \ne 0$, and the density-term
|
||||
is suppressed, $\hat{D} = 0$. The trapping potential depth is
|
||||
approximately 5 recoil energies.}
|
||||
\label{fig:WannierFT}
|
||||
\begin{figure}[hbtp!]
|
||||
\centering
|
||||
\includegraphics[width=0.8\linewidth]{BDiagram}
|
||||
\caption[Maximising Light-Matter Coupling between Lattice
|
||||
Sites]{Light field arrangements which maximise coupling, $u_1^*u_0$,
|
||||
between lattice sites. The thin black line indicates the trapping
|
||||
potential (not to scale). (a) Arrangement for the uniform pattern
|
||||
$J_{i,i+1} = J_1$. (b) Arrangement for spatially varying pattern
|
||||
$J_{i,i+1}=(-1)^m J_2$; here $u_0=1$ so it is not shown and $u_1$
|
||||
is real thus $u_1^*u_0=u_1$. \label{fig:BDiagram}}
|
||||
\end{figure}
|
||||
|
||||
The simplest case is to find a diffraction maximum where $J_{i,i+1} =
|
||||
J_B$. This can be achieved by crossing the light modes such that
|
||||
$\theta_0 = -\theta_1$ and $k_{0x} = k_{1x} = \pi/d$ and choosing the
|
||||
light mode phases such that $\varphi_+ = 0$. Fig. \ref{fig:WannierFT}c
|
||||
shows the value of the $J_{i,j}$ coefficients under these
|
||||
circumstances. In order to make the $\hat{B}$ contribution to light
|
||||
scattering dominant we need to set $\hat{D} = 0$ which from
|
||||
Eq. \eqref{eq:FTs} we see is possible if $\varphi_0 = -\varphi_1 =
|
||||
\arccos[-\mathcal{F}[W_0](2\pi/d)/\mathcal{F}[W_0](0)]/2$. This
|
||||
arrangement of light modes maximizes the interference signal,
|
||||
\begin{figure}[hbtp!]
|
||||
\centering
|
||||
\includegraphics[width=\linewidth]{WF_S}
|
||||
\caption[Wannier Function Products]{The Wannier function products:
|
||||
(a) $W_0(x)$ (solid line, right axis), $W_1(x)$ (dashed line, left
|
||||
axis) and their (b) Fourier transforms $\mathcal{F}[W_{0,1}]$. The
|
||||
Density $J_{i,i}$ and matter-interference $J_{i,i+1}$ coefficients
|
||||
in diffraction maximum (c) and minimum (d) as are shown as
|
||||
functions of standing wave shifts $\varphi$ or, if one were to
|
||||
measure the quadrature variance $(\Delta X^F_\beta)^2$, the local
|
||||
oscillator phase $\beta$. The black points indicate the positions,
|
||||
where light measures matter interference $\hat{B} \ne 0$, and the
|
||||
density-term is suppressed, $\hat{D} = 0$. The trapping potential
|
||||
depth is approximately 5 recoil energies.}
|
||||
\label{fig:WannierProducts}
|
||||
\end{figure}
|
||||
|
||||
The simplest case is to find a diffraction maximum where
|
||||
$J_{i,i+1} = J_1$, where $J_1$ is a constant. This can be achieved by
|
||||
crossing the light modes such that $\theta_0 = -\theta_1$ and
|
||||
$k_{0x} = k_{1x} = \pi/d$ and choosing the light mode phases such that
|
||||
$\varphi_+ = 0$. Fig. \ref{fig:BDiagram}a shows the resulting light
|
||||
mode functions and their product along the lattice and
|
||||
Fig. \ref{fig:WannierProducts}c shows the value of the $J_{i,j}$
|
||||
coefficients under these circumstances. In order to make the $\hat{B}$
|
||||
contribution to light scattering dominant we need to set $\hat{D} = 0$
|
||||
which from Eq. \eqref{eq:FTs} we see is possible if
|
||||
\begin{equation}
|
||||
\xi \equiv \varphi_0 = -\varphi_1 =
|
||||
\frac{1}{2}\arccos[-\mathcal{F}[W_0]\left(\frac{2\pi}{d}\right)/\mathcal{F}[W_0](0)].
|
||||
\end{equation}
|
||||
This arrangement of light modes maximizes the interference signal,
|
||||
$\hat{B}$, by suppressing the density signal, $\hat{D}$, via
|
||||
interference compensating for the spreading of the Wannier
|
||||
functions.
|
||||
interference compensating for the spreading of the Wannier functions.
|
||||
|
||||
Another possibility is to obtain an alternating pattern similar
|
||||
corresponding to a classical diffraction minimum. We consider an
|
||||
arrangement where the beams are arranged such that $k_{0x} = 0$ and
|
||||
corresponding to a diffraction minimum. We consider an arrangement
|
||||
where the beams are arranged such that $k_{0x} = 0$ and
|
||||
$k_{1x} = \pi/d$ which gives the following expressions for the density
|
||||
and interference terms
|
||||
\begin{eqnarray}
|
||||
\begin{align}
|
||||
\label{eq:DMin}
|
||||
\hat{D} = \mathcal{F}[W_0](\pi/d) \sum_m (-1)^m \hat{n}_m
|
||||
\cos(\varphi_0) \cos(\varphi_1) \nonumber \\ \hat{B} =
|
||||
-\mathcal{F}[W_1](\pi/d) \sum_m (-1)^m \hat{B}_m
|
||||
\cos(\varphi_0) \sin(\varphi_1).
|
||||
\end{eqnarray}
|
||||
The corresponding $J_{i,j}$ coefficients are shown in
|
||||
Fig. \ref{fig:WannierFT}d for $\varphi_0=0$. It is clear that for
|
||||
$\varphi_1 = \pm \pi/2$, $\hat{D} = 0$, which is intuitive as this
|
||||
places the lattice sites at the nodes of the mode $u_1(x)$. This is a
|
||||
diffraction minimum as the light amplitude is also zero, $\langle
|
||||
\hat{B} \rangle = 0$, because contributions from alternating
|
||||
inter-site regions interfere destructively. However, the intensity
|
||||
$\langle \ad_1 \a \rangle = |C|^2 \langle \hat{B}^2 \rangle$ is
|
||||
proportional to the variance of $\hat{B}$ and is non-zero.
|
||||
\hat{D} = & \mathcal{F}[W_0](\pi/d) \sum_m (-1)^m \hat{n}_m
|
||||
\cos(\varphi_0) \cos(\varphi_1) \nonumber \\
|
||||
\hat{B} = & -\mathcal{F}[W_1](\pi/d) \sum_m (-1)^m \hat{B}_m
|
||||
\cos(\varphi_0) \sin(\varphi_1).
|
||||
\end{align}
|
||||
The corresponding $J_{i,j}$ coefficients are given by
|
||||
$J_{i,i+1} = -(-1)^i J_2$, where $J_2$ is a constant, and are shown in
|
||||
Fig. \ref{fig:WannierProducts}d for $\varphi_0=0$. The light mode
|
||||
coupling along the lattice is shown in Fig. \ref{fig:BDiagram}b. It is
|
||||
clear that for $\varphi_1 = \pm \pi/2$, $\hat{D} = 0$, which is
|
||||
intuitive as this places the lattice sites at the nodes of the mode
|
||||
$u_1(x)$. This is a diffraction minimum as the light amplitude is also
|
||||
zero, $\langle \hat{B} \rangle = 0$, because contributions from
|
||||
alternating inter-site regions interfere destructively. However, the
|
||||
intensity $\langle \ad_1 \a \rangle = |C|^2 \langle \hat{B}^2 \rangle$
|
||||
is proportional to the variance of $\hat{B}$ and is non-zero.
|
||||
|
||||
\mynote{explain quadrature}
|
||||
Alternatively, one can use the arrangement for a diffraction minimum
|
||||
described above, but use travelling instead of standing waves for the
|
||||
probe and detected beams and measure the light quadrature variance. In
|
||||
this case $\hat{X}^F_\beta = \hat{D} \cos(\beta) + \hat{B}
|
||||
\sin(\beta)$ and by varying the local oscillator phase, one can choose
|
||||
which conjugate operator to measure.
|
||||
|
||||
\mynote{fix labels}
|
||||
\begin{figure}[hbtp!]
|
||||
\includegraphics[width=\linewidth]{BDiagram}
|
||||
\caption[Maximising Light-Matter Coupling between Lattice
|
||||
Sites]{Light field arrangements which maximise coupling,
|
||||
$u_1^*u_0$, between lattice sites. The thin black line
|
||||
indicates the trapping potential (not to scale). (a)
|
||||
Arrangement for the uniform pattern $J_{m,m+1} = J_1$. (b)
|
||||
Arrangement for spatially varying pattern $J_{m,m+1}=(-1)^m
|
||||
J_2$; here $u_0=1$ so it is not shown and $u_1$ is real thus
|
||||
$u_1^*u_0=u_1$. \label{fig:BDiagram}}
|
||||
\end{figure}
|
||||
probe and detected beams and measure the light quadrature variance.
|
||||
In this case
|
||||
$\hat{X}^F_\beta = \hat{D} \cos(\beta) + \hat{B} \sin(\beta)$ and by
|
||||
varying the local oscillator phase, one can choose which conjugate
|
||||
operator to measure.
|
||||
|
||||
\subsection{Electric Field Stength}
|
||||
\label{sec:Efield}
|
||||
|
||||
The Electric field operator at position $\b{r}$ and at time $t$ is
|
||||
usually written in terms of its positive and negative components:
|
||||
@ -634,7 +671,7 @@ atom located at $\b{r}^\prime$ at the observation point $\b{r}$ is
|
||||
given by
|
||||
\begin{equation}
|
||||
\label{eq:Ep}
|
||||
\b{\hat{E}}^{(+)}(\b{r},\b{r}^\prime,t) = \frac{\omega_a^2 d \sin \eta}{4 \pi
|
||||
\b{\hat{E}}^{(+)}(\b{r},\b{r}^\prime,t) = \frac{\omega_a^2 d_A \sin \eta}{4 \pi
|
||||
\epsilon_0 c^2 |\b{r} - \b{r}^\prime|} \hat{\epsilon} \sigma^-
|
||||
\left( \b{r}^\prime, t - \frac{|\b{r} - \b{r}^\prime|}{c} \right),
|
||||
\end{equation}
|
||||
@ -644,10 +681,9 @@ in the far field, $\eta$ is the angle the dipole makes with
|
||||
$\b{r} - \b{r}^\prime$, $\hat{\epsilon}$ is the polarization vector
|
||||
which is perpendicular to $\b{r} - \b{r}^\prime$ and lies in the plane
|
||||
defined by $\b{r} - \b{r}^\prime$ and the dipole, $\omega_a$ is the
|
||||
atomic transition frequency, and $d$ is the dipole matrix element
|
||||
atomic transition frequency, and $d_A$ is the dipole matrix element
|
||||
between the two levels, and $c$ is the speed of light in vacuum.
|
||||
|
||||
|
||||
We have already derived an expression for the atomic lowering
|
||||
operator, $\sigma^-$, in Eq. \eqref{eq:sigmam} and it is given by
|
||||
\begin{equation}
|
||||
|
||||
BIN
Chapter3/Figs/Ep1.pdf
Normal file
BIN
Chapter3/Figs/Ep1.pdf
Normal file
Binary file not shown.
BIN
Chapter3/Figs/Quads.pdf
Normal file
BIN
Chapter3/Figs/Quads.pdf
Normal file
Binary file not shown.
BIN
Chapter3/Figs/WF_S.pdf
Normal file
BIN
Chapter3/Figs/WF_S.pdf
Normal file
Binary file not shown.
BIN
Chapter3/Figs/oph11.pdf
Normal file
BIN
Chapter3/Figs/oph11.pdf
Normal file
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BIN
Chapter3/Figs/oph22.pdf
Normal file
BIN
Chapter3/Figs/oph22.pdf
Normal file
Binary file not shown.
@ -2,8 +2,8 @@
|
||||
%*********************************** Third Chapter *****************************
|
||||
%*******************************************************************************
|
||||
|
||||
\chapter{Probing Matter-Field and Atom-Number Correlations in Optical Lattices
|
||||
by Global Nondestructive Addressing} %Title of the Third Chapter
|
||||
\chapter{Probing Correlations by Global
|
||||
Nondestructive Addressing} %Title of the Third Chapter
|
||||
|
||||
\ifpdf
|
||||
\graphicspath{{Chapter3/Figs/Raster/}{Chapter3/Figs/PDF/}{Chapter3/Figs/}}
|
||||
@ -13,3 +13,481 @@
|
||||
|
||||
|
||||
%********************************** %First Section **************************************
|
||||
|
||||
\section{Introduction}
|
||||
|
||||
Having developed the basic theoretical framework within which we can
|
||||
treat the fully quantum regime of light-matter interactions we now
|
||||
consider possible applications. There are three prominent directions
|
||||
in which we can apply our model: nondestructive probing, quantum
|
||||
measurement backaction and quantum optical lattices. Here, we deal
|
||||
with the first of the three options.
|
||||
|
||||
\mynote{adjust for the fact that the derivation of B operator has been moved}
|
||||
\mynote{update some outdated mentions to previous experiments}
|
||||
In this chapter we develop a method to measure properties of ultracold
|
||||
gases in optical lattices by light scattering. We show that such
|
||||
measurements can reveal not only density correlations, but also
|
||||
matter-field interference. Recent quantum non-demolition (QND)
|
||||
schemes \cite{rogers2014, mekhov2007prl, eckert2008} probe density
|
||||
fluctuations and thus inevitably destroy information about phase,
|
||||
i.e.~the conjugate variable, and as a consequence destroy matter-field
|
||||
coherence. In contrast, we focus on probing the atom interference
|
||||
between lattice sites. Our scheme is nondestructive in contrast to
|
||||
totally destructive methods such as time-of-flight measurements. It
|
||||
enables in-situ probing of the matter-field coherence at its shortest
|
||||
possible distance in an optical lattice, i.e. the lattice period,
|
||||
which defines key processes such as tunnelling, currents, phase
|
||||
gradients, etc. This is achieved by concentrating light between the
|
||||
sites. By contrast, standard destructive time-of-flight measurements
|
||||
deal with far-field interference and a relatively near-field one was
|
||||
used in Ref. \cite{miyake2011}. Such a counter-intuitive configuration
|
||||
may affect works on quantum gases trapped in quantum potentials
|
||||
\cite{mekhov2012, mekhov2008, larson2008, chen2009, habibian2013,
|
||||
ivanov2014, caballero2015} and quantum measurement-induced
|
||||
preparation of many-body atomic states \cite{mazzucchi2016,
|
||||
mekhov2009prl, pedersen2014, elliott2015}. Within the mean-field
|
||||
treatment, this enables measurements of the order parameter,
|
||||
matter-field quadratures and squeezing. This can have an impact on
|
||||
atom-wave metrology and information processing in areas where quantum
|
||||
optics already made progress, e.g., quantum imaging with pixellized
|
||||
sources of non-classical light \cite{golubev2010, kolobov1999}, as an
|
||||
optical lattice is a natural source of multimode nonclassical matter
|
||||
waves.
|
||||
|
||||
Furthermore, the scattering angular distribution is nontrivial, even
|
||||
when classical diffraction is forbidden and we derive generalized
|
||||
Bragg conditions for this situation. The method works beyond
|
||||
mean-field, which we demonstrate by distinguishing all three phases in
|
||||
the Mott insulator - superfluid - Bose glass phase transition in a 1D
|
||||
disordered optical lattice. We underline that transitions in 1D are
|
||||
much more visible when changing an atomic density rather than for
|
||||
fixed-density scattering. It was only recently that an experiment
|
||||
distinguished a Mott insulator from a Bose glass \cite{derrico2014}.
|
||||
|
||||
\section{Global Nondestructive Measurement}
|
||||
|
||||
As we have seen in section \ref{sec:a} under certain approximations
|
||||
the scattered light mode, $\a_1$, is linked to the quantum state of
|
||||
matter via
|
||||
\begin{equation}
|
||||
\label{eq:a-3}
|
||||
\a_1 = C \hat{F} = C \left(\hat{D} + \hat{B} \right),
|
||||
\end{equation}
|
||||
where the atomic operators $\hat{D}$ and $\hat{B}$, given by
|
||||
Eq. \eqref{eq:D} and Eq. \eqref{eq:B}, are responsible for the
|
||||
coupling to on-site density and inter-site interference
|
||||
respectively. It crucial to note that light couples to the bosons via
|
||||
an operator as this makes it sensitive to the quantum state of the
|
||||
matter.
|
||||
|
||||
Here, we will use this fact that the light is sensitive to the atomic
|
||||
quantum state due to the coupling of the optical and matter fields via
|
||||
operators in order to develop a method to probe the properties of an
|
||||
ultracold gas. Therefore, we neglect the measurement back-action and
|
||||
we will only consider expectation values of light observables. Since
|
||||
the scheme is nondestructive (in some cases, it even satisfies the
|
||||
stricter requirements for a QND measurement \cite{mekhov2007pra,
|
||||
mekhov2012}) and the measurement only weakly perturbs the system,
|
||||
many consecutive measurements can be carried out with the same atoms
|
||||
without preparing a new sample. Again, we will show how the extreme
|
||||
flexibility of the the measurement operator $\hat{F}$ allows us to
|
||||
probe a variety of different atomic properties in-situ ranging from
|
||||
density correlations to matter-field interference.
|
||||
|
||||
\subsection{On-site density measurements}
|
||||
|
||||
Typically, the dominant term in $\hat{F}$ is the density term
|
||||
$\hat{D}$, rather than inter-site matter-field interference $\hat{B}$
|
||||
\cite{mekhov2007pra, rist2010, lakomy2009, ruostekoski2009,
|
||||
LP2009}. However, before we move onto probing the interference
|
||||
terms, $\hat{B}$, we will first discuss typical light scattering. We
|
||||
start with a simpler case when scattering is faster than tunneling and
|
||||
$\hat{F} = \hat{D}$. This corresponds to a QND scheme
|
||||
\cite{mekhov2007prl, mekhov2007pra, eckert2008, rogers2014}. The
|
||||
density-related measurement destroys some matter-phase coherence in
|
||||
the conjugate variable \cite{mekhov2009pra, LP2010, LP2011}
|
||||
$\bd_i b_{i+1}$, but this term is neglected. For this purpose we will
|
||||
define an auxiliary quantity,
|
||||
\begin{equation}
|
||||
\label{eq:R}
|
||||
R = \langle \ad_1 \a_1 \rangle - | \langle \a_1 \rangle |^2,
|
||||
\end{equation}
|
||||
which we will call the ``quantum addition'' to light scattering. $R$
|
||||
is simply the full light intensity minus the classical field intensity
|
||||
and thus it faithfully represents the new contribution from the
|
||||
quantum light-matter interaction to the diffraction pattern.
|
||||
|
||||
\begin{figure}[htbp!]
|
||||
\centering
|
||||
\includegraphics[width=\linewidth]{Ep1}
|
||||
\caption[Light Scattering Angular Distribution]{Light intensity
|
||||
scattered into a standing wave mode from a superfluid in a 3D
|
||||
lattice (units of $R/N_K$). Arrows denote incoming travelling wave
|
||||
probes. The Bragg condition, $\Delta \b{k} = \b{G}$, is not
|
||||
fulfilled, so there is no classical diffraction, but intensity
|
||||
still shows multiple peaks, whose heights are tunable by simple
|
||||
phase shifts of the optical beams: (a) $\varphi_1=0$; (b)
|
||||
$\varphi_1=\pi/2$. Interestingly, there is also a significant
|
||||
uniform background level of scattering which does not occur in its
|
||||
classical counterpart. }
|
||||
\label{fig:Scattering}
|
||||
\end{figure}
|
||||
|
||||
In a deep lattice,
|
||||
\begin{equation}
|
||||
\hat{D}=\sum_i^K u_1^*({\bf r}_i) u_0({\bf r}_i) \hat{n}_i,
|
||||
\end{equation}
|
||||
which for travelling
|
||||
[$u_l(\b{r})=\exp(i \b{k}_l \cdot \b{r}+i\varphi_l)$] or standing
|
||||
[$u_l(\b{r})=\cos(\b{k}_l \cdot \b{r}+\varphi_l)$] waves is just a
|
||||
density Fourier transform at one or several wave vectors
|
||||
$\pm(\b{k}_1 \pm \b{k}_0)$. The quadrature, as defined in section
|
||||
\ref{sec:a}, for two travelling waves is reduced to
|
||||
\begin{equation}
|
||||
\hat{X}^F_\beta = \sum_i^K \hat{n}_i\cos[(\b{k}_1 - \b{k}_2) \cdot
|
||||
\b{r}_i - \beta].
|
||||
\end{equation}
|
||||
Note that different light quadratures are differently coupled to the
|
||||
atom distribution, hence varying local oscillator phase and detection
|
||||
angle, one scans the coupling from maximal to zero. An identical
|
||||
expression exists for $\hat{D}$ for a standing wave, where $\beta$ is
|
||||
replaced by $\varphi_l$, and scanning is achieved by varying the
|
||||
position of the wave with respect to atoms. Thus, variance
|
||||
$(\Delta X^F_\beta)^2$ and quantum addition $R$, have a non-trivial
|
||||
angular dependence, showing more peaks than classical diffraction and
|
||||
the peaks can be tuned by the light-atom coupling.
|
||||
|
||||
Fig. \ref{fig:Scattering} shows the angular dependence of $R$ for
|
||||
standing and travelling waves scattering from bosons in a 3D optical
|
||||
lattice. The isotropic background gives the density fluctuations
|
||||
[$R = K( \langle \hat{n}^2 \rangle - \langle \hat{n} \rangle^2 )/2$ in
|
||||
mean-field with inter-site correlations neglected]. The radius of the
|
||||
sphere changes from zero, when it is a Mott insulator with suppressed
|
||||
fluctuations, to half the atom number at $K$ sites, $N_K/2$, in the
|
||||
deep superfluid. There exist peaks at angles different than the
|
||||
classical Bragg ones and thus, can be observed without being masked by
|
||||
classical diffraction. Interestingly, even if 3D diffraction
|
||||
\cite{miyake2011} is forbidden as seen in Fig. \ref{fig:Scattering},
|
||||
the peaks are still present. As $(\Delta X^F_\beta)^2$ and $R$ are
|
||||
quadratic variables, the generalized Bragg conditions for the peaks
|
||||
are $2 \Delta \b{k} = \b{G}$ for quadratures of travelling waves,
|
||||
where $\Delta \b{k} = \b{k}_0 - \b{k}_1$ and $\b{G}$ is the reciprocal
|
||||
lattice vector, and $2 \b{k}_1 = \b{G}$ for standing wave $\a_1$ and
|
||||
travelling $\a_0$, which is clearly different from the classical Bragg
|
||||
condition $\Delta \b{k} = \b{G}$. The peak height is tunable by the
|
||||
local oscillator phase or standing wave shift as seen in Fig.
|
||||
\ref{fig:Scattering}b.
|
||||
|
||||
In section \ref{sec:Efield} we have estimated the mean photon
|
||||
scattering rates integrated over the solid angle for the only two
|
||||
experiments so far on light diffraction from truly ultracold bosons
|
||||
where the measurement object was light
|
||||
\begin{equation}
|
||||
n_{\Phi}= \left(\frac{\Omega_0}{\Delta_a}\right)^2 \frac{\Gamma K}{8}
|
||||
(\langle\hat{n}^2\rangle-\langle\hat{n}\rangle^2).
|
||||
\end{equation}
|
||||
The background signal should reach $n_\Phi \approx 10^6$ s$^{-1}$ in
|
||||
Ref. \cite{weitenberg2011} (150 atoms in 2D), and
|
||||
$n_\Phi \approx 10^{11}$ s$^{-1}$ in Ref. \cite{miyake2011} ($10^5$
|
||||
atoms in 3D). These numbers show that the diffraction patterns we have
|
||||
seen due to the ``quantum addition'' should be visible using currently
|
||||
available technology, especially since the most prominent features,
|
||||
such as Bragg diffraction peaks, do not coincide at all with the
|
||||
classical diffraction pattern.
|
||||
|
||||
\subsection{Matter-field interference measurements}
|
||||
|
||||
We now focus on enhancing the interference term $\hat{B}$ in the
|
||||
operator $\hat{F}$.
|
||||
|
||||
Firstly, we will use this result to show how one can probe
|
||||
$\langle \hat{B} \rangle$ which in MF gives information about the
|
||||
matter-field amplitude, $\Phi = \langle b \rangle$.
|
||||
|
||||
Hence, by measuring the light quadrature we probe the kinetic energy
|
||||
and, in MF, the matter-field amplitude (order parameter) $\Phi$:
|
||||
$\langle \hat{X}^F_{\beta=0} \rangle = | \Phi |^2
|
||||
\mathcal{F}[W_1](2\pi/d) (K-1)$.
|
||||
|
||||
Secondly, we show that it is also possible to access the fluctuations
|
||||
of matter-field quadratures $\hat{X}^b_\alpha = (b e^{-i\alpha} + \bd
|
||||
e^{i\alpha})/2$, which in MF can be probed by measuring the variance
|
||||
of $\hat{B}$. Across the phase transition, the matter field changes
|
||||
its state from Fock (in MI) to coherent (deep SF) through an
|
||||
amplitude-squeezed state as shown in Fig. \ref{Quads}(a,b).
|
||||
|
||||
Assuming $\Phi$ is real in MF:
|
||||
\begin{equation}
|
||||
\label{intensity}
|
||||
\langle \ad_1 \a_1 \rangle = 2 |C|^2(K-1)\mathcal{F}^2[W_1](\frac{\pi}{d})
|
||||
\times [ ( \langle b^2 \rangle - \Phi^2 )^2 + ( n - \Phi^2 ) ( 1 +n - \Phi^2 ) ]
|
||||
\end{equation}
|
||||
and it is shown as a function of $U/(zJ^\text{cl})$ in
|
||||
Fig. \ref{Quads}. Thus, since measurement in the diffraction maximum
|
||||
yields $\Phi^2$ we can deduce $\langle b^2 \rangle - \Phi^2$ from the
|
||||
intensity. This quantity is of great interest as it gives us access to
|
||||
the quadrature variances of the matter-field
|
||||
\begin{equation}
|
||||
(\Delta X^b_{0,\pi/2})^2 = 1/4 + [(n - \Phi^2) \pm
|
||||
(\langle b^2 \rangle - \Phi^2)]/2,
|
||||
\end{equation}
|
||||
where $n=\langle\hat{n}\rangle$ is the mean on-site atomic density.
|
||||
|
||||
\begin{figure}[htbp!]
|
||||
\centering
|
||||
\includegraphics[width=\linewidth]{Quads}
|
||||
\captionsetup{justification=centerlast,font=small}
|
||||
\caption[Mean-Field Matter Quadratures]{Photon number scattered in a
|
||||
diffraction minimum, given by Eq. (\ref{intensity}), where
|
||||
$\tilde{C} = 2 |C|^2 (K-1) \mathcal{F}^2 [W_1](\pi/d)$. More
|
||||
light is scattered from a MI than a SF due to the large
|
||||
uncertainty in phase in the insulator. (a) The variances of
|
||||
quadratures $\Delta X^b_0$ (solid) and $\Delta X^b_{\pi/2}$
|
||||
(dashed) of the matter field across the phase transition. Level
|
||||
1/4 is the minimal (Heisenberg) uncertainty. There are three
|
||||
important points along the phase transition: the coherent state
|
||||
(SF) at A, the amplitude-squeezed state at B, and the Fock state
|
||||
(MI) at C. (b) The uncertainties plotted in phase space.}
|
||||
\label{Quads}
|
||||
\end{figure}
|
||||
|
||||
Probing $\hat{B}^2$ gives us access to kinetic energy fluctuations
|
||||
with 4-point correlations ($\bd_i b_j$ combined in pairs). Measuring
|
||||
the photon number variance, which is standard in quantum optics, will
|
||||
lead up to 8-point correlations similar to 4-point density
|
||||
correlations \cite{mekhov2007pra}. These are of significant interest,
|
||||
because it has been shown that there are quantum entangled states that
|
||||
manifest themselves only in high-order correlations
|
||||
\cite{kaszlikowski2008}.
|
||||
|
||||
Surprisingly, inter-site terms scatter more light from a Mott
|
||||
insulator than a superfluid Eq. \eqref{intensity}, as shown in
|
||||
Fig. \eqref{Quads}, although the mean inter-site density
|
||||
$\langle \hat{n}(\b{r})\rangle $ is tiny in a MI. This reflects a
|
||||
fundamental effect of the boson interference in Fock states. It indeed
|
||||
happens between two sites, but as the phase is uncertain, it results
|
||||
in the large variance of $\hat{n}(\b{r})$ captured by light as shown
|
||||
in Eq. \eqref{intensity}. The interference between two macroscopic
|
||||
BECs has been observed and studied theoretically
|
||||
\cite{horak1999}. When two BECs in Fock states interfere a phase
|
||||
difference is established between them and an interference pattern is
|
||||
observed which disappears when the results are averaged over a large
|
||||
number of experimental realizations. This reflects the large
|
||||
shot-to-shot phase fluctuations corresponding to a large inter-site
|
||||
variance of $\hat{n}(\b{r})$. By contrast, our method enables the
|
||||
observation of such phase uncertainty in a Fock state directly between
|
||||
lattice sites on the microscopic scale in-situ.
|
||||
|
||||
\subsection{Mapping the quantum phase diagram}
|
||||
|
||||
\begin{figure}[htbp!]
|
||||
\centering
|
||||
\includegraphics[width=\linewidth]{oph11}
|
||||
\caption[Mapping the Bose-Hubbard Phase Diagram]{(a) The angular
|
||||
dependence of scattered light $R$ for a superfluid (thin black,
|
||||
left scale, $U/2J^\text{cl} = 0$) and Mott insulator (thick green,
|
||||
right scale, $U/2J^\text{cl} =10$). The two phases differ in both
|
||||
their value of $R_\text{max}$ as well as $W_R$ showing that
|
||||
density correlations in the two phases differ in magnitude as well
|
||||
as extent. Light scattering maximum $R_\text{max}$ is shown in (b,
|
||||
d) and the width $W_R$ in (c, e). It is very clear that varying
|
||||
chemical potential $\mu$ or density $\langle n\rangle$ sharply
|
||||
identifies the superfluid-Mott insulator transition in both
|
||||
quantities. (b) and (c) are cross-sections of the phase diagrams
|
||||
(d) and (e) at $U/2J^\text{cl}=2$ (thick blue), 3 (thin purple),
|
||||
and 4 (dashed blue). Insets show density dependencies for the
|
||||
$U/(2 J^\text{cl}) = 3$ line. $K=M=N=25$.}
|
||||
\label{fig:SFMI}
|
||||
\end{figure}
|
||||
|
||||
We have shown how in mean-field, we can track the order parameter,
|
||||
$\Phi$, by probing the matter-field interference using the coupling of
|
||||
light to the $\hat{B}$ operator. In this case, it is very easy to
|
||||
follow the superfluid to Mott insulator quantum phase transition since
|
||||
we have direct access to the order parameter which goes to zero in the
|
||||
insulating phase. In fact, if we're only interested in the critical
|
||||
point, we only need access to any quantity that yields information
|
||||
about density fluctuations which also go to zero in the MI phase and
|
||||
this can be obtained by measuring
|
||||
$\langle \hat{D}^\dagger \hat{D} \rangle$. However, there are many
|
||||
situations where the mean-field approximation is not a valid
|
||||
description of the physics. A prominent example is the Bose-Hubbard
|
||||
model in 1D \cite{cazalilla2011, ejima2011, kuhner2000, pino2012,
|
||||
pino2013}. Observing the transition in 1D by light at fixed density
|
||||
was considered to be difficult \cite{rogers2014} or even impossible
|
||||
\cite{roth2003}. By contrast, here we propose varying the density or
|
||||
chemical potential, which sharply identifies the transition. We
|
||||
perform these calculations numerically by calculating the ground state
|
||||
using DMRG methods \cite{tnt} from which we can compute all the
|
||||
necessary atomic observables. Experiments typically use an additional
|
||||
harmonic confining potential on top of the optical lattice to keep the
|
||||
atoms in place which means that the chemical potential will vary in
|
||||
space. However, with careful consideration of the full
|
||||
($\mu/2J^\text{cl}$, $U/2J^\text{cl}$) phase diagrams in
|
||||
Fig. \ref{fig:SFMI}(d,e) our analysis can still be applied to the
|
||||
system \cite{batrouni2002}.
|
||||
|
||||
The 1D phase transition is best understood in terms of two-point
|
||||
correlations as a function of their separation \cite{giamarchi}. In
|
||||
the Mott insulating phase, the two-point correlations
|
||||
$\langle \bd_i b_j \rangle$ and
|
||||
$\langle \delta \hat{n}_i \delta \hat{n}_j \rangle$
|
||||
($\delta \hat{n}_i =\hat{n}_i-\langle \hat{n}_i\rangle$) decay
|
||||
exponentially with $|i-j|$. On the other hand the superfluid will
|
||||
exhibit long-range order which in dimensions higher than one,
|
||||
manifests itself with an infinite correlation length. However, in 1D
|
||||
only pseudo long-range order happens and both the matter-field and
|
||||
density fluctuation correlations decay algebraically \cite{giamarchi}.
|
||||
|
||||
The method we propose gives us direct access to the structure factor,
|
||||
which is a function of the two-point correlation $\langle \delta
|
||||
\hat{n}_i \delta \hat{n}_j \rangle$, by measuring the light
|
||||
intensity. For two travelling waves maximally coupled to the density
|
||||
(atoms are at light intensity maxima so $\hat{F} = \hat{D}$), the
|
||||
quantum addition is given by
|
||||
\begin{equation}
|
||||
R =\sum_{i, j} \exp[i (\mathbf{k}_1 - \mathbf{k}_0)
|
||||
(\mathbf{r}_i - \mathbf{r}_j)] \langle \delta \hat{n}_i \delta
|
||||
\hat{n}_j \rangle,
|
||||
\end{equation}
|
||||
|
||||
The angular dependence of $R$ for a Mott insulator and a superfluid is
|
||||
shown in Fig. \ref{fig:SFMI}a, and there are two variables
|
||||
distinguishing the states. Firstly, maximal $R$,
|
||||
$R_\text{max} \propto \sum_i \langle \delta \hat{n}_i^2 \rangle$,
|
||||
probes the fluctuations and compressibility $\kappa'$
|
||||
($\langle \delta \hat{n}^2_i \rangle \propto \kappa' \langle \hat{n}_i
|
||||
\rangle$). The Mott insulator is incompressible and thus will have
|
||||
very small on-site fluctuations and it will scatter little light
|
||||
leading to a small $R_\text{max}$. The deeper the system is in the MI
|
||||
phase (i.e. that larger the $U/2J^\text{cl}$ ratio is), the smaller
|
||||
these values will be until ultimately it will scatter no light at all
|
||||
in the $U \rightarrow \infty$ limit. In Fig. \ref{fig:SFMI}a this can
|
||||
be seen in the value of the peak in $R$. The value $R_\text{max}$ in
|
||||
the SF phase ($U/2J^\text{cl} = 0$) is larger than its value in the MI
|
||||
phase ($U/2J^\text{cl} = 10$) by a factor of
|
||||
$\sim$25. Figs. \ref{fig:SFMI}(b,d) show how the value of
|
||||
$R_\text{max}$ changes across the phase transition. We see that the
|
||||
transition shows up very sharply as $\mu$ is varied.
|
||||
|
||||
Secondly, being a Fourier transform, the width $W_R$ of the dip in $R$
|
||||
is a direct measure of the correlation length $l$, $W_R \propto
|
||||
1/l$. The Mott insulator being an insulating phase is characterised by
|
||||
exponentially decaying correlations and as such it will have a very
|
||||
large $W_R$. However, the superfluid in 1D exhibits pseudo long-range
|
||||
order which manifests itself in algebraically decaying two-point
|
||||
correlations \cite{giamarchi} which significantly reduces the dip in
|
||||
the $R$. This can be seen in Fig. \ref{fig:SFMI}a and we can also see
|
||||
that this identifies the phase transition very sharply as $\mu$ is
|
||||
varied in Figs. \ref{fig:SFMI}(c,e). One possible concern with
|
||||
experimentally measuring $W_R$ is that it might be obstructed by the
|
||||
classical diffraction maxima which appear at angles corresponding to
|
||||
the minima in $R$. However, the width of such a peak is much smaller
|
||||
as its width is proportional to $1/M$.
|
||||
|
||||
It is also possible to analyse the phase transition quantitatively
|
||||
using our method. Unlike in higher dimensions where an order parameter
|
||||
can be easily defined within the MF approximation there is no such
|
||||
quantity in 1D. However, a valid description of the relevant 1D low
|
||||
energy physics is provided by Luttinger liquid theory
|
||||
\cite{giamarchi}. In this model correlations in the supefluid phase as
|
||||
well as the superfluid density itself are characterised by the
|
||||
Tomonaga-Luttinger parameter, $K_b$. This parameter also identifies
|
||||
the phase transition in the thermodynamic limit at $K_b = 1/2$. This
|
||||
quantity can be extracted from various correlation functions and in
|
||||
our case it can be extracted directly from $R$ \cite{ejima2011}. By
|
||||
extracting this parameter from $R$ for various lattice lengths from
|
||||
numerical DMRG calculations it was even possible to give a theoretical
|
||||
estimate of the critical point for commensurate filling, $N = M$, in
|
||||
the thermodynamic limit to occur at $U/2J^\text{cl} \approx 1.64$
|
||||
\cite{ejima2011}. Our proposal provides a method to directly measure
|
||||
$R$ in a lab which can then be used to experimentally determine the
|
||||
location of the critical point in 1D.
|
||||
|
||||
So far both variables we considered, $R_\text{max}$ and $W_R$, provide
|
||||
similar information. Next, we present a case where it is very
|
||||
different. The Bose glass is a localized insulating phase with
|
||||
exponentially decaying correlations but large compressibility and
|
||||
on-site fluctuations in a disordered optical lattice. Therefore,
|
||||
measuring both $R_\text{max}$ and $W_R$ will distinguish all the
|
||||
phases. In a Bose glass we have finite compressibility, but
|
||||
exponentially decaying correlations. This gives a large $R_\text{max}$
|
||||
and a large $W_R$. A Mott insulator will also have exponentially
|
||||
decaying correlations since it is an insulator, but it will be
|
||||
incompressible. Thus, it will scatter light with a small
|
||||
$R_\text{max}$ and large $W_R$. Finally, a superfluid will have long
|
||||
range correlations and large compressibility which results in a large
|
||||
$R_\text{max}$ and a small $W_R$.
|
||||
|
||||
\begin{figure}[htbp!]
|
||||
\centering
|
||||
\includegraphics[width=\linewidth]{oph22}
|
||||
\caption[Mapping the Disoredered Phase Diagram]{The
|
||||
Mott-superfluid-glass phase diagrams for light scattering maximum
|
||||
$R_\text{max}/N_K$ (a) and width $W_R$ (b). Measurement of both
|
||||
quantities distinguish all three phases. Transition lines are
|
||||
shifted due to finite size effects \cite{roux2008}, but it is
|
||||
possible to apply well known numerical methods to extract these
|
||||
transition lines from such experimental data extracted from $R$
|
||||
\cite{ejima2011}. $K=M=N=35$.}
|
||||
\label{fig:BG}
|
||||
\end{figure}
|
||||
|
||||
We confirm this in Fig. \ref{fig:BG} for simulations with the ratio of
|
||||
superlattice- to trapping lattice-period $r\approx 0.77$ for various
|
||||
disorder strengths $V$ \cite{roux2008}. Here, we only consider
|
||||
calculations for a fixed density, because the usual interpretation of
|
||||
the phase diagram in the ($\mu/2J^\text{cl}$, $U/2J^\text{cl}$) plane
|
||||
for a fixed ratio $V/U$ becomes complicated due to the presence of
|
||||
multiple compressible and incompressible phases between successive MI
|
||||
lobes \cite{roux2008}. This way, we have limited our parameter space
|
||||
to the three phases we are interested in: superfluid, Mott insulator,
|
||||
and Bose glass. From Fig. \ref{fig:BG} we see that all three phases
|
||||
can indeed be distinguished. In the 1D BHM there is no sharp MI-SF
|
||||
phase transition in 1D at a fixed density \cite{cazalilla2011,
|
||||
ejima2011, kuhner2000, pino2012, pino2013} just like in
|
||||
Figs. \ref{fig:SFMI}(d,e) if we follow the transition through the tip
|
||||
of the lobe which corresponds to a line of unit density. However,
|
||||
despite the lack of an easily distinguishable critical point it is
|
||||
possible to quantitatively extract the location of the transition
|
||||
lines by extracting the Tomonaga-Luttinger parameter from the
|
||||
scattered light, $R$, in the same way it was done for an unperturbed
|
||||
BHM \cite{ejima2011}.
|
||||
|
||||
Only recently \cite{derrico2014} a Bose glass phase was studied by
|
||||
combined measurements of coherence, transport, and excitation spectra,
|
||||
all of which are destructive techniques. Our method is simpler as it
|
||||
only requires measurement of the quantity $R$ and additionally, it is
|
||||
nondestructive.
|
||||
|
||||
\section{Conclusions}
|
||||
|
||||
In summary, we proposed a nondestructive method to probe quantum gases
|
||||
in an optical lattice. Firstly, we showed that the density-term in
|
||||
scattering has an angular distribution richer than classical
|
||||
diffraction, derived generalized Bragg conditions, and estimated
|
||||
parameters for the only two relevant experiments to date
|
||||
\cite{weitenberg2011, miyake2011}. Secondly, we proposed how to
|
||||
measure the matter-field interference by concentrating light between
|
||||
the sites. This corresponds to interference at the shortest possible
|
||||
distance in an optical lattice. By contrast, standard destructive
|
||||
time-of-flight measurements deal with far-field interference and a
|
||||
relatively near-field one was used in Ref. \cite{miyake2011}. This
|
||||
defines most processes in optical lattices. E.g. matter-field phase
|
||||
changes may happen not only due to external gradients, but also due to
|
||||
intriguing effects such quantum jumps leading to phase flips at
|
||||
neighbouring sites and sudden cancellation of tunneling
|
||||
\cite{vukics2007}, which should be accessible by our method. In
|
||||
mean-field, one can measure the matter-field amplitude (order
|
||||
parameter), quadratures and squeezing. This can link atom optics to
|
||||
areas where quantum optics has already made progress, e.g., quantum
|
||||
imaging \cite{golubev2010, kolobov1999}, using an optical lattice as
|
||||
an array of multimode nonclassical matter-field sources with a high
|
||||
degree of entanglement for quantum information processing. Thirdly, we
|
||||
demonstrated how the method accesses effects beyond mean-field and
|
||||
distinguishes all the phases in the Mott-superfluid-glass transition,
|
||||
which is currently a challenge \cite{derrico2014}. Based on
|
||||
off-resonant scattering, and thus being insensitive to a detailed
|
||||
atomic level structure, the method can be extended to molecules
|
||||
\cite{LP2013}, spins, and fermions \cite{ruostekoski2009}.
|
||||
|
||||
@ -92,7 +92,7 @@
|
||||
% Choose linespacing as appropriate. Default is one-half line spacing as per the
|
||||
% University guidelines
|
||||
|
||||
% \doublespacing
|
||||
\doublespacing
|
||||
% \onehalfspacing
|
||||
% \singlespacing
|
||||
|
||||
|
||||
@ -1,6 +1,258 @@
|
||||
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
||||
%% Books, theses, reference material
|
||||
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
||||
|
||||
@book{foot,
|
||||
author = {Foot, C. J.},
|
||||
title = {{Atomic Physics}},
|
||||
publisher = {Oxford University Press},
|
||||
year = {2005}
|
||||
}
|
||||
@book{giamarchi,
|
||||
author = {Giamarchi, T.},
|
||||
title = {{Quantum Physics in One Dimension}},
|
||||
publisher = {Clarendon Press, Oxford},
|
||||
year = {2003}
|
||||
}
|
||||
@phdthesis{weitenbergThesis,
|
||||
author = {Weitenberg, Christof},
|
||||
number = {April},
|
||||
title = {{Single-Atom Resolved Imaging and Manipulation in an Atomic
|
||||
Mott Insulator}},
|
||||
year = {2011}
|
||||
}
|
||||
@article{steck,
|
||||
author = {Steck, Daniel Adam},
|
||||
title = {{Rubidium 87 D Line Data Author contact information :}},
|
||||
url = {http://steck.us/alkalidata}
|
||||
}
|
||||
@inbook{Scully,
|
||||
author = {Scully, M. and Zubairy, S.},
|
||||
title = {{Quantum Optics}},
|
||||
publisher = {Cambridge University Press},
|
||||
chapter = {10.1},
|
||||
pages = {293},
|
||||
year = {1997}
|
||||
}
|
||||
@misc{tnt,
|
||||
howpublished="\url{http://ccpforge.cse.rl.ac.uk/gf/project/tntlibrary/}"
|
||||
}
|
||||
|
||||
|
||||
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
||||
%% Igor's original papers
|
||||
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
||||
|
||||
@article{mekhov2007prl,
|
||||
title={Cavity-enhanced light scattering in optical lattices to probe
|
||||
atomic quantum statistics},
|
||||
author={Mekhov, Igor B and Maschler, Christoph and Ritsch, Helmut},
|
||||
journal={Physical review letters},
|
||||
volume={98},
|
||||
number={10},
|
||||
pages={100402},
|
||||
year={2007},
|
||||
publisher={APS}
|
||||
}
|
||||
@article{mekhov2007pra,
|
||||
title={Light scattering from ultracold atoms in optical lattices as
|
||||
an optical probe of quantum statistics},
|
||||
author={Mekhov, Igor B and Maschler, Christoph and Ritsch, Helmut},
|
||||
journal={Physical Review A},
|
||||
volume={76},
|
||||
number={5},
|
||||
pages={053618},
|
||||
year={2007},
|
||||
publisher={APS}
|
||||
}
|
||||
@article{mekhov2008,
|
||||
title = {Dicke quantum phase transition with a superfluid gas in an
|
||||
optical cavity},
|
||||
author = {Maschler, C. and Mekhov, I. B. and Ritsch, H.},
|
||||
journal = {Eur. Phys. J. D},
|
||||
volume = {146},
|
||||
pages = {545},
|
||||
year = {2008},
|
||||
}
|
||||
@article{mekhov2009prl,
|
||||
author = {Mekhov, Igor B and Ritsch, Helmut},
|
||||
doi = {10.1103/PhysRevLett.102.020403},
|
||||
journal = {Phys. Rev. Lett.},
|
||||
month = jan,
|
||||
number = {2},
|
||||
pages = {020403},
|
||||
title = {{Quantum Nondemolition Measurements and State Preparation
|
||||
in Quantum Gases by Light Detection}},
|
||||
volume = {102},
|
||||
year = {2009}
|
||||
}
|
||||
@article{mekhov2009pra,
|
||||
author = {Mekhov, Igor B and Ritsch, Helmut},
|
||||
doi = {10.1103/PhysRevA.80.013604},
|
||||
journal = {Phys. Rev. A},
|
||||
month = jul,
|
||||
number = {1},
|
||||
pages = {013604},
|
||||
title = {{Quantum optics with quantum gases: Controlled state
|
||||
reduction by designed light scattering}},
|
||||
volume = {80},
|
||||
year = {2009}
|
||||
}
|
||||
@article{LP2009,
|
||||
title={Quantum optics with quantum gases},
|
||||
author={Mekhov, Igor B and Ritsch, Helmut},
|
||||
journal={Laser physics},
|
||||
volume={19},
|
||||
number={4},
|
||||
pages={610--615},
|
||||
year={2009},
|
||||
publisher={Springer}
|
||||
}
|
||||
@article{LP2010,
|
||||
author = {Mekhov, Igor B and Ritsch, Helmut},
|
||||
doi = {10.1134/S1054660X10050105},
|
||||
journal = {Laser Phys.},
|
||||
volume = {20},
|
||||
pages = {694},
|
||||
title = {Quantum Optical Measurements in Ultracold Gases:
|
||||
Macroscopic Bose–Einstein Condensates},
|
||||
year = {2010}
|
||||
}
|
||||
@article{LP2011,
|
||||
author = {Mekhov, Igor B and Ritsch, Helmut},
|
||||
doi = {10.1134/S1054660X11150163},
|
||||
journal = {Laser Phys.},
|
||||
volume = {21},
|
||||
pages = {1486},
|
||||
title = {Atom State Evolution and Collapse in Ultracold Gases during
|
||||
Light Scattering into a Cavity},
|
||||
year = {2011}
|
||||
}
|
||||
@article{LP2013,
|
||||
author={Igor B Mekhov},
|
||||
title={Quantum non-demolition detection of polar molecule complexes:
|
||||
dimers, trimers, tetramers},
|
||||
journal={Laser Phys.},
|
||||
volume={23},
|
||||
number={1},
|
||||
pages={015501},
|
||||
year={2013},
|
||||
}
|
||||
@article{mekhov2012,
|
||||
title={Quantum optics with ultracold quantum gases: towards the full
|
||||
quantum regime of the light--matter interaction},
|
||||
author={Mekhov, Igor B and Ritsch, Helmut},
|
||||
journal={Journal of Physics B: Atomic, Molecular and Optical
|
||||
Physics},
|
||||
volume={45},
|
||||
number={10},
|
||||
pages={102001},
|
||||
year={2012},
|
||||
publisher={IOP Publishing}
|
||||
}
|
||||
|
||||
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
||||
%% Group papers
|
||||
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
||||
|
||||
@article{elliott2015,
|
||||
author = {Elliott, T. J. and Kozlowski, W. and Caballero-Benitez,
|
||||
S. F. and Mekhov, I. B.},
|
||||
doi = {10.1103/PhysRevLett.114.113604},
|
||||
journal = {Phys. Rev. Lett.},
|
||||
pages = {113604},
|
||||
title = {{Multipartite Entangled Spatial Modes of Ultracold Atoms
|
||||
Generated and Controlled by Quantum Measurement}},
|
||||
volume = {114},
|
||||
year = {2015}
|
||||
}
|
||||
@article{atoms2015,
|
||||
title={Probing and Manipulating Fermionic and Bosonic Quantum Gases
|
||||
with Quantum Light},
|
||||
author={Elliott, Thomas J and Mazzucchi, Gabriel and Kozlowski,
|
||||
Wojciech and Caballero-Benitez, Santiago F and
|
||||
Mekhov, Igor B},
|
||||
journal={Atoms},
|
||||
volume={3},
|
||||
number={3},
|
||||
pages={392--406},
|
||||
year={2015},
|
||||
publisher={Multidisciplinary Digital Publishing Institute}
|
||||
}
|
||||
@article{mazzucchi2016,
|
||||
title = {Quantum measurement-induced dynamics of many-body ultracold
|
||||
bosonic and fermionic systems in optical lattices},
|
||||
author = {Mazzucchi, Gabriel and Kozlowski, Wojciech and
|
||||
Caballero-Benitez, Santiago F. and Elliott, Thomas
|
||||
J. and Mekhov, Igor B.},
|
||||
journal = {Physical Review A},
|
||||
volume = {93},
|
||||
issue = {2},
|
||||
pages = {023632},
|
||||
numpages = {12},
|
||||
year = {2016},
|
||||
month = {Feb},
|
||||
publisher = {American Physical Society}
|
||||
}
|
||||
@article{kozlowski2016zeno,
|
||||
title={Non-hermitian dynamics in the quantum zeno limit},
|
||||
author={Kozlowski, Wojciech and Caballero-Benitez, Santiago F and Mekhov, Igor B},
|
||||
journal={arXiv preprint arXiv:1510.04857},
|
||||
year={2015}
|
||||
}
|
||||
@article{mazzucchi2016af,
|
||||
title={Quantum measurement-induced antiferromagnetic order and
|
||||
density modulations in ultracold Fermi gases in
|
||||
optical lattices},
|
||||
author={Mazzucchi, Gabriel and Caballero-Benitez, Santiago F and
|
||||
Mekhov, Igor B},
|
||||
journal={arXiv preprint arXiv:1510.04883},
|
||||
year={2015}
|
||||
}
|
||||
|
||||
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
||||
%% Other papers
|
||||
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
||||
|
||||
@article{walters2013,
|
||||
title = {Ab initio derivation of Hubbard models for cold atoms in
|
||||
optical lattices},
|
||||
author = {Walters, R. and Cotugno, G. and Johnson, T. H. and Clark,
|
||||
S. R. and Jaksch, D.},
|
||||
journal = {Phys. Rev. A},
|
||||
volume = {87},
|
||||
pages = {043613},
|
||||
year = {2013},
|
||||
month = {Apr},
|
||||
doi = {10.1103/PhysRevA.87.043613},
|
||||
}
|
||||
@article{bloch2011,
|
||||
title = {Single-spin addressing in an atomic Mott insulator},
|
||||
author = {Weitenberg, C. and Endres, M. and Sherson, J. F. and
|
||||
Cheneau, M. and Schauss, P. and Fukuhara, T. and
|
||||
Bloch, I. and Kuhr, S.},
|
||||
journal = {Nature},
|
||||
volume = {471},
|
||||
pages = {319--324},
|
||||
year = {2011},
|
||||
doi = {10.1038/nature09827},
|
||||
}
|
||||
@article{greiner2009,
|
||||
title = {A quantum gas microscope for detecting single atoms in a
|
||||
Hubbard-regime optical lattice},
|
||||
author = {Bakr, W. S. and Gillen, J. I. and Peng, A. and Folling,
|
||||
S. and Greiner, M.},
|
||||
journal = {Nature},
|
||||
volume = {462},
|
||||
pages = {74--77},
|
||||
year = {2009},
|
||||
doi = {10.1038/nature08482},
|
||||
}
|
||||
@article{cirac1996,
|
||||
title={Continuous observation of interference fringes from Bose condensates},
|
||||
author={Cirac, J I and Gardiner, C W and Naraschewski, M and Zoller, P},
|
||||
title={Continuous observation of interference fringes from Bose
|
||||
condensates},
|
||||
author={Cirac, J I and Gardiner, C W and Naraschewski, M and Zoller,
|
||||
P},
|
||||
journal={Physical Review A},
|
||||
volume={54},
|
||||
number={5},
|
||||
@ -19,7 +271,8 @@
|
||||
publisher={APS}
|
||||
}
|
||||
@article{ruostekoski1997,
|
||||
title={Nondestructive optical measurement of relative phase between two Bose-Einstein condensates},
|
||||
title={Nondestructive optical measurement of relative phase between
|
||||
two Bose-Einstein condensates},
|
||||
author={Ruostekoski, Janne and Walls, Dan F},
|
||||
journal={Physical Review A},
|
||||
volume={56},
|
||||
@ -30,7 +283,8 @@
|
||||
}
|
||||
@article{ruostekoski1998,
|
||||
title={Macroscopic superpositions of Bose-Einstein condensates},
|
||||
author={Ruostekoski, Janne and Collett, M J and Graham, Robert and Walls, Dan F},
|
||||
author={Ruostekoski, Janne and Collett, M J and Graham, Robert and
|
||||
Walls, Dan F},
|
||||
journal={Physical Review A},
|
||||
volume={57},
|
||||
number={1},
|
||||
@ -39,7 +293,8 @@
|
||||
publisher={APS}
|
||||
}
|
||||
@article{ashida2015,
|
||||
title={Diffraction-Unlimited Position Measurement of Ultracold Atoms in an Optical Lattice},
|
||||
title={Diffraction-Unlimited Position Measurement of Ultracold Atoms
|
||||
in an Optical Lattice},
|
||||
author={Ashida, Yuto and Ueda, Masahito},
|
||||
journal={Physical review letters},
|
||||
volume={115},
|
||||
@ -49,14 +304,17 @@
|
||||
publisher={APS}
|
||||
}
|
||||
@article{ashida2015a,
|
||||
title={Multi-Particle Quantum Dynamics under Continuous Observation},
|
||||
title={Multi-Particle Quantum Dynamics under Continuous
|
||||
Observation},
|
||||
author={Ashida, Yuto and Ueda, Masahito},
|
||||
journal={arXiv preprint arXiv:1510.04001},
|
||||
year={2015}
|
||||
}
|
||||
@article{rogers2014,
|
||||
title={Characterization of Bose-Hubbard models with quantum nondemolition measurements},
|
||||
author={Rogers, B and Paternostro, M and Sherson, J F and De Chiara, G},
|
||||
title={Characterization of Bose-Hubbard models with quantum
|
||||
nondemolition measurements},
|
||||
author={Rogers, B and Paternostro, M and Sherson, J F and De Chiara,
|
||||
G},
|
||||
journal={Physical Review A},
|
||||
volume={90},
|
||||
number={4},
|
||||
@ -64,16 +322,6 @@
|
||||
year={2014},
|
||||
publisher={APS}
|
||||
}
|
||||
@article{LP2009,
|
||||
title={Quantum optics with quantum gases},
|
||||
author={Mekhov, Igor B and Ritsch, Helmut},
|
||||
journal={Laser physics},
|
||||
volume={19},
|
||||
number={4},
|
||||
pages={610--615},
|
||||
year={2009},
|
||||
publisher={Springer}
|
||||
}
|
||||
@article{rist2012,
|
||||
title={Homodyne detection of matter-wave fields},
|
||||
author={Rist, Stefan and Morigi, Giovanna},
|
||||
@ -84,26 +332,12 @@
|
||||
year={2012},
|
||||
publisher={APS}
|
||||
}
|
||||
@book{foot,
|
||||
author = {Foot, C. J.},
|
||||
title = {{Atomic Physics}},
|
||||
publisher = {Oxford University Press},
|
||||
year = {2005}
|
||||
}
|
||||
@phdthesis{weitenbergThesis,
|
||||
author = {Weitenberg, Christof},
|
||||
number = {April},
|
||||
title = {{Single-Atom Resolved Imaging and Manipulation in an Atomic Mott Insulator}},
|
||||
year = {2011}
|
||||
}
|
||||
@article{steck,
|
||||
author = {Steck, Daniel Adam},
|
||||
title = {{Rubidium 87 D Line Data Author contact information :}},
|
||||
url = {http://steck.us/alkalidata}
|
||||
}
|
||||
@article{weitenberg2011,
|
||||
title={Coherent light scattering from a two-dimensional Mott insulator},
|
||||
author={Weitenberg, Christof and Schau{\ss}, Peter and Fukuhara, Takeshi and Cheneau, Marc and Endres, Manuel and Bloch, Immanuel and Kuhr, Stefan},
|
||||
title={Coherent light scattering from a two-dimensional Mott
|
||||
insulator},
|
||||
author={Weitenberg, Christof and Schau{\ss}, Peter and Fukuhara,
|
||||
Takeshi and Cheneau, Marc and Endres, Manuel and
|
||||
Bloch, Immanuel and Kuhr, Stefan},
|
||||
journal={Physical review letters},
|
||||
volume={106},
|
||||
number={21},
|
||||
@ -112,8 +346,11 @@ url = {http://steck.us/alkalidata}
|
||||
publisher={APS}
|
||||
}
|
||||
@article{miyake2011,
|
||||
title={Bragg scattering as a probe of atomic wave functions and quantum phase transitions in optical lattices},
|
||||
author={Miyake, Hirokazu and Siviloglou, Georgios A and Puentes, Graciana and Pritchard, David E and Ketterle, Wolfgang and Weld, David M},
|
||||
title={Bragg scattering as a probe of atomic wave functions and
|
||||
quantum phase transitions in optical lattices},
|
||||
author={Miyake, Hirokazu and Siviloglou, Georgios A and Puentes,
|
||||
Graciana and Pritchard, David E and Ketterle,
|
||||
Wolfgang and Weld, David M},
|
||||
journal={Physical review letters},
|
||||
volume={107},
|
||||
number={17},
|
||||
@ -121,69 +358,303 @@ url = {http://steck.us/alkalidata}
|
||||
year={2011},
|
||||
publisher={APS}
|
||||
}
|
||||
@article{mekhov2012,
|
||||
title={Quantum optics with ultracold quantum gases: towards the full quantum regime of the light--matter interaction},
|
||||
author={Mekhov, Igor B and Ritsch, Helmut},
|
||||
journal={Journal of Physics B: Atomic, Molecular and Optical Physics},
|
||||
volume={45},
|
||||
number={10},
|
||||
pages={102001},
|
||||
year={2012},
|
||||
publisher={IOP Publishing}
|
||||
@article{eckert2008,
|
||||
title = {Dicke quantum phase transition with a superfluid gas in an optical cavity},
|
||||
author = {Eckert, K. and Romero-Isart, O. and Rodriguez, M. and
|
||||
Lewenstein, M. and Polzik, E. S. and Sanpera, A.},
|
||||
journal = {Nat. Phys.},
|
||||
volume = {4},
|
||||
pages = {50},
|
||||
year = {2008},
|
||||
}
|
||||
@article{mazzucchi2016,
|
||||
title = {Quantum measurement-induced dynamics of many-body ultracold bosonic and fermionic systems in optical lattices},
|
||||
author = {Mazzucchi, Gabriel and Kozlowski, Wojciech and Caballero-Benitez, Santiago F. and Elliott, Thomas J. and Mekhov, Igor B.},
|
||||
journal = {Physical Review A},
|
||||
volume = {93},
|
||||
issue = {2},
|
||||
pages = {023632},
|
||||
numpages = {12},
|
||||
year = {2016},
|
||||
@article{larson2008,
|
||||
title = {Mott-Insulator States of Ultracold Atoms in Optical
|
||||
Resonators},
|
||||
author = {Larson, Jonas and Damski, Bogdan and Morigi, Giovanna and
|
||||
Lewenstein, Maciej},
|
||||
journal = {Phys. Rev. Lett.},
|
||||
volume = {100},
|
||||
issue = {5},
|
||||
pages = {050401},
|
||||
numpages = {4},
|
||||
year = {2008},
|
||||
month = {Feb},
|
||||
publisher = {American Physical Society}
|
||||
publisher = {American Physical Society},
|
||||
doi = {10.1103/PhysRevLett.100.050401},
|
||||
}
|
||||
@article{atoms2015,
|
||||
title={Probing and Manipulating Fermionic and Bosonic Quantum Gases with Quantum Light},
|
||||
author={Elliott, Thomas J and Mazzucchi, Gabriel and Kozlowski, Wojciech and Caballero-Benitez, Santiago F and Mekhov, Igor B},
|
||||
journal={Atoms},
|
||||
volume={3},
|
||||
number={3},
|
||||
pages={392--406},
|
||||
year={2015},
|
||||
publisher={Multidisciplinary Digital Publishing Institute}
|
||||
@article{chen2009,
|
||||
title = {Bistable Mott-insulator\char21{}to\char21{}superfluid phase
|
||||
transition in cavity optomechanics},
|
||||
author = {Chen, W. and Zhang, K. and Goldbaum, D. S. and
|
||||
Bhattacharya, M. and Meystre, P.},
|
||||
journal = {Phys. Rev. A},
|
||||
volume = {80},
|
||||
issue = {1},
|
||||
pages = {011801},
|
||||
numpages = {4},
|
||||
year = {2009},
|
||||
month = {Jul},
|
||||
publisher = {American Physical Society},
|
||||
doi = {10.1103/PhysRevA.80.011801},
|
||||
}
|
||||
@article{mazzucchi2016af,
|
||||
title={Quantum measurement-induced antiferromagnetic order and density modulations in ultracold Fermi gases in optical lattices},
|
||||
author={Mazzucchi, Gabriel and Caballero-Benitez, Santiago F and Mekhov, Igor B},
|
||||
journal={arXiv preprint arXiv:1510.04883},
|
||||
year={2015}
|
||||
@article{habibian2013,
|
||||
title = {Bose-Glass Phases of Ultracold Atoms due to Cavity
|
||||
Backaction},
|
||||
author = {Habibian, Hessam and Winter, Andr\'e and Paganelli, Simone
|
||||
and Rieger, Heiko and Morigi, Giovanna},
|
||||
journal = {Phys. Rev. Lett.},
|
||||
volume = {110},
|
||||
issue = {7},
|
||||
pages = {075304},
|
||||
numpages = {5},
|
||||
year = {2013},
|
||||
month = {Feb},
|
||||
publisher = {American Physical Society},
|
||||
doi = {10.1103/PhysRevLett.110.075304},
|
||||
}
|
||||
@inbook{Scully,
|
||||
author = {Scully, M. and Zubairy, S.},
|
||||
title = {{Quantum Optics}},
|
||||
publisher = {Cambridge University Press},
|
||||
chapter = {10.1},
|
||||
pages = {293},
|
||||
year = {1997}
|
||||
@article{ivanov2014,
|
||||
title={Feedback-enhanced self-organization of atoms in an optical cavity},
|
||||
author={Ivanov, DA and Ivanova, T Yu},
|
||||
journal={JETP letters},
|
||||
volume={100},
|
||||
number={7},
|
||||
pages={481--485},
|
||||
year={2014},
|
||||
publisher={Springer}
|
||||
}
|
||||
@article{mekhov2007prl,
|
||||
title={Cavity-enhanced light scattering in optical lattices to probe atomic quantum statistics},
|
||||
author={Mekhov, Igor B and Maschler, Christoph and Ritsch, Helmut},
|
||||
@article{caballero2015,
|
||||
title={Quantum optical lattices for emergent many-body phases of
|
||||
ultracold atoms},
|
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author={Caballero-Benitez, Santiago F and Mekhov, Igor B},
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year={2015},
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publisher={APS}
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}
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title={Light scattering from ultracold atoms in optical lattices as an optical probe of quantum statistics},
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author={Mekhov, Igor B and Maschler, Christoph and Ritsch, Helmut},
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@article{golubev2010,
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title = {Entanglement measurement of the quadrature components
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without homodyne detection in the bright, spatially
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Gori, Lorenzo and Roux, Guillaume and McCulloch, Ian
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}
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@article{lakomy2009,
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title = {Thermal effects in light scattering from ultracold bosons
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in an optical lattice},
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author = {\L{}akomy, Kazimierz and Idziaszek, Zbigniew and
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Trippenbach, Marek},
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@article{kaszlikowski2008,
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}
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@article{pino2012,
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}
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month = Jan,
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number = {1},
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pages = {51--58},
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title = {{Capturing the re-entrant behavior of one-dimensional Bose-Hubbard model}},
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volume = {250},
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year = {2013}
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}
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}
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@article{batrouni2002,
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archivePrefix = {arXiv},
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arxivId = {cond-mat/0203082},
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author = {Batrouni, G G and Rousseau, V and Scalettar, R T and
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Rigol, M and Muramatsu, A and Denteneer, P J H and
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Troyer, M},
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pages = {117203},
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primaryClass = {cond-mat},
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title = {{Mott domains of bosons confined on optical lattices.}},
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volume = {89},
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year = {2002}
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}
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@article{roux2008,
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month = aug,
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pages = {023628},
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title = {{Quasiperiodic Bose-Hubbard model and localization in
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volume = {78},
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year = {2008}
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}
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@article{vukics2007,
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author = {Vukics, A. and Maschler, C. and Ritsch, H.},
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volume = {9},
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pages = {255},
|
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year = {2007},
|
||||
}
|
||||
@ -1,7 +1,7 @@
|
||||
% ******************************* PhD Thesis Template **************************
|
||||
% Please have a look at the README.md file for info on how to use the template
|
||||
|
||||
\documentclass[a4paper,12pt,times,numbered,print,index,draft]{Classes/PhDThesisPSnPDF}
|
||||
\documentclass[a4paper,12pt,times,numbered,print,index]{Classes/PhDThesisPSnPDF}
|
||||
|
||||
% ******************************************************************************
|
||||
% ******************************* Class Options ********************************
|
||||
|
||||
Reference in New Issue
Block a user