All plenary lectures and short talks will take place in the Clough Undergraduate Learning Common (CULC) room 152
8:30am Plenary Lecture  9:30am  10:00am Short Talk/Poster  11:00am Plenary Lecture  ⇈  

10/8  Michael AizenmanTitle: Emergent Pfaffian Relations in QuasiPlanar Models Abstract: 
Coffee Break 
Short Talk
Nelson Javier Buitrago AzaTitle: Large Deviation Principles for Weakly Interacting Fermions Abstract: We show that the Gärtner–Ellis scaled cumulant generating function of fluctuation measures associated to KMS states of weakly interacting fermions on the lattice can be written as the limit of a sequence of logarithms of Gaussian Grassmann–Berezin integrals. Moreover, the covariances of the Gaussian integrals have a uniform determinant bound. As a consequence, the Grassmann integral representation may be used to obtain convergent expansions of the generating function in terms of powers of its parameter. The derivation and analysis of these expansions are studied via Brydges–Kennedy tree expansions. The proof of uniformity of the determinant bound given here uses Hölder inequalities for Schatten norms as a key argument. Søren FournaisTitle: The semiclassical limit of large fermionic systems Abstract: We study a system of $N$ fermions in the regime where the intensity of the interaction scales as $1/N$ and with an effective semiclassical parameter $\hbar=N^{1/d}$ where $d$ is the space dimension. For a large class of interaction potentials and of external electromagnetic fields, we prove the convergence to the ThomasFermi minimizers in the limit $N\to\infty$. The limit is expressed using manyparticle coherent states and Wigner functions. The method of proof is based on a fermionic de FinettiHewittSavage theorem in phase space and on a careful analysis of the possible lack of compactness at infinity. This is bases on joint work with Mathieu Lewin and Jan Philip Solovej David MüllerTitle: LiebThirring and CwickelLiebRozenblum inequalities for perturbed graphene with a Coulomb impurity Abstract: We study the two dimensional massless CoulombDirac operator restricted to its positive spectral subspace and prove estimates on the negative eigenvalues created by electromagnetic perturbations. Takuya MineTitle: Spectral shift function for the magnetic Schroedinger operators Abstract: The spectral shift function (SSF) for the Schroedinger operator is usually defined only when the scalar potential decays sufficiently fast. In the case of the magnetic Schroedinger operator in the Euclidean plane, the vector potential has longrange decay if the total magnetic flux is nonzero, and then SSF cannot be defined in the ordinary sense. In this talk, we show that SSF for the magnetic Schroedinger operator in the Euclidean plane can be defined in some weak sense, even if the total magnetic flux is nonzero. In particular, we give some explicit formula for the SSF for the AharonovBohm magnetic field. 
Alessandro GiulianiTitle: Universality of transport coefficients in the HaldaneHubbard model. Abstract: In this talk I will review some selected aspects of the theory of interacting electrons on the honeycomb lattice, with special emphasis on the mathematics of the HaldaneHubbard model: this is a model for interacting electrons on the hexagonal lattice, in the presence of nearest and nexttonearest neighbor hopping, as well as of a transverse dipolar magnetic field. I will discuss the key properties of its phase diagram, most notably the phase transition from a standard insulating phase to a Chern insulator, across a critical line, where the system exhibits semimetallic behavior. I will also review the universality of its transport coefficients, including the quantization of the transverse conductivity within the gapped phases, and that of the longitudinal conductivity on the critical line. The methods of proof combine constructive Renormalization Group methods with the use of Ward Identities and the SchwingerDyson equation. Based on joint works with Vieri Mastropietro, Marcello Porta, Ian Jauslin.  
10/9 
Yoshiko OgataTitle: A class of asymmetric gapped Hamiltonians on quantum spin chains and its characterization. Abstract: Recently, the classification problem of gapped Hamiltonians attracts a lot of attentions. We consider this problem for a class of Hamiltonians on quantum spin chains. This class is characterized by five qualitative properties. On the other hand, the Hamiltonians are MPS(Matrix product state)Hamiltonian with some structure. This structure enable us to classify them. 
Conference Photo Coffee Break  Poster
Kimmy CushmanTitle: Lie Algebras in Quantum Field Theories Abstract: We discuss the progress made in the study of Lie Algebras through the lens of quantum field theory. We compare the physical and mathematical interpretations of Clifford Algebras. We plan to investigate the effects of choice of bases and new bases representations for this algebra on Dirac Spinor theories. Shingo KukitaTitle: nonMarkovian dynamics from singular perturbation method Abstract: We derived a complete positive map representing nonMarkovian dynamics for a finite dimensional system by using a singular perturbation method. A mixing property of the environment coupled with the target system plays an important role. In this presentation, we will explain our derivation of the complete positive map and compere its dynamics with that of other nonMarkovian master equations. Josiah ParkTitle: Asymptotics for Steklov Eigenvalues on NonSmooth Domains Abstract: We study eigenfunctions and eigenvalues of the DirichlettoNeumann operator on boxes in Euclidean spaces. We consider bounds on the counting function for the Steklov spectrum on such domains. Diane PelejoTitle: Maximum Fidelity under Mixed Unitary or Unital Quantum Channels Abstract: Let $\rho_1$ and $\rho_2$ be fixed quantum states. We describe a simple algorithm to determine the maximum value for the fidelity $F(\rho_1,\Phi(\rho))$ between $\rho_1$ and an image $\Phi(\rho_2)$ of $\rho_2$ under any mixed unitary channel $\Phi$ or under any unital channel $\Phi$. Itaru Sasaki Title: Embedded Eigenvalues and NeumannWigner Potentials for Relativistic Schrodinger Operators Abstract: We construct NeumannWigner type potentials for the massive relativistic Schrodinger operator in one and three dimensions for which a strictly positive eigenvalue embedded in the continuous spectrum exists. We show that in the nonrelativistic limit these potentials converge to the classical NeumannWigner potentials. Thus, the potentials constructed this talk can be considered as a relativistic generalization of the NeumannWigner potentials. Cem YuceTitle: Selfaccelerating Parabolic Cylinder Waves in 1D Abstract: We introduce a new selfaccelerating wave packet solution of the Schrodinger equation in one dimension. We obtain an exact analytical parabolic cylinder wave for the inverted harmonic potential. We show that truncated parabolic cylinder waves exhibits their accelerating feature. 
Michael WeinsteinTitle: Honeycomb Schroedinger Operators in the Strong Binding Regime Abstract: We discuss the Schroedinger operator for a large class of periodic potentials with the symmetry of a hexagonal tiling of the plane. The potentials we consider are superpositions of localized potential wells, centered on the vertices of a regular honeycomb structure, corresponding to the single electron model of graphene and its artificial analogues. We consider the regime of strong binding, where the depth of the potential wells is large. Our main result is that for sufficiently deep potentials, the lowest two FloquetBloch dispersion surfaces, when appropriately rescaled, converge uniformly to those of the twoband tightbinding model, introduced by PR Wallace (1947) in his pioneering study of graphite. We then discuss corollaries, in the strong binding regime, on (a) the existence of spectral gaps for honeycomb potentials with PT symmetrybreaking perturbations, and (b) the existence of topologically protected edge states for honeycomb structures with "rational edges". This is joint work with CL Fefferman and JP LeeThorp.  
10/10 
Svetlana JitomirskayaTitle: Quasiperiodic Schrodinger operators: sharp arithmetic spectral transitions and universal hierarchical structure of eigenfunction Abstract: We will review recent results on sharp arithmetic spectral transitions in some popular models: Harper's, extended Harper's, Maryland, as well as the general class of analytic potentials (papers joint with A. Avila, R. Han, H. Kruger, W. Liu, C. Marx, F. Yang, S. Zhang, and Q. Zhou) and then focus on a recently discovered universal hierarchical structure in the behavior of quasiperiodic eigenfunctions (joint work with W. Liu). The structure is governed by the continued fraction expansion of the frequency and explains some predictions in physics literature. 
Coffee Break  Short Talk
Matthew ChaTitle: The complete set of infinite volume ground states for Kitaev's abelian quantum double models Abstract: We study the set of infinite volume ground states of Kitaev's quantum double model on $\mathbb{Z}^2$ for an arbitrary finite abelian group $G$. In the finite volume, the ground state space is frustrationfree and the lowlying excitations correspond to abelian anyons. The ribbon operators act on the ground state space to create pairs of single excitations at their endpoints. It is known that in the infinite volume these models have a unique frustrationfree ground state. We show that the complete set of ground states decomposes into $G^2$ different charged sectors, corresponding to the different types of abelian anyons (or superselection sectors). In particular, all pure ground states are equivalent to the single excitation states. Our proof proceeds by showing that each ground state can be obtained as the weak$*$limit of the finite volume ground states of the quantum double model with a suitable boundary term. The boundary terms allow for states which represent an excitation pair with one excitation in the bulk and one pinned to the boundary to be included in the ground state space. This is joint work with P. Naaijkens and B. Nachtergaele. Christoph FischbacherTitle: The proper dissipative extensions of a dual pair Abstract: Let A and (−B) be dissipative operators on a Hilbert space H and let (A,B) form a dual pair, i.e. A⊂B*, resp. B⊂A*. We present a method of determining the proper dissipative extensions A' of this dual pair, i.e. A⊂A'⊂B* provided that D(A)∩D(B) is dense in H. Applications to symmetric operators, symmetric operators perturbed by a relatively bounded dissipative operator and more singular differential operators are discussed. Eugene DumitrescuTitle: Discrimination of correlated and entangling quantum channels with selective process tomography Abstract: The accurate and reliable characterization of quantum dynamical processes underlies efforts to validate quantum technologies, where discrimination between competing models of observed behaviors inform efforts to fabricate and operate qubit devices. We present a novel protocol for quantum channel discrimination that leverages advances in direct characterization of quantum dynamics (DCQD) codes. We demonstrate that DCQD codes enable selective process tomography to improve discrimination between entangling and correlated quantum dynamics. Numerical simulations show selective process tomography requires only a few measurement configurations to achieve a low false alarm rate and that the DCQD encoding improves the resilience of the protocol to hidden sources of noise. Our results show that selective process tomography with DCQD codes is useful for efficiently distinguishing sources of correlated crosstalk from uncorrelated noise in current and future experimental platforms. Yese J. FelipeTitle: Quantum Music: Applying Quantum Theory to Music Theory and Composition Abstract: Classical and popular music is written so that the melody, harmony, rhythm is independent of the listener and the instance when it is played, providing the same experience to all listeners. By applying concepts from Quantum Theory to Music Theory, a linear combination of melodies and harmonies can be composed, establishing a unique experience for different listeners. The application of some concepts of Quantum Theory and their effects on the outcome of a quantum musical composition will be discussed. 
Maciej ZworskiTitle: Microlocal methods in dynamical systems Abstract: Microlocal analysis exploits mathematical manifestations of the classical/quantum (particle/wave) correspondence and has been a successful tool in spectral theory and partial differential equations. We can say that these last two fields lie on the quantum/wave side. Recently, microlocal methods have been applied to the study of classical dynamical problems, in particular of chaotic (Anosov) flows. I will illustrate this by proving that the order of vanishing of the dynamical zeta function at zero for negatively curved surfaces is given by the absolute value of the Euler characteristic (joint work with S Dyatlov). 

10/11 
Peter KuchmentTitle: Analytic properties of dispersion relations and spectra of periodic operators Abstract: The talk will survey some known results and unresolved problems concerning analytic properties of dispersion relations and their role in various spectral theory problems for periodic operators of mathematical physics, such as spectral structure, embedded impurity eigenvalues, Greens function asymptotics, Liouville theorems, etc. 
Coffee Break  Short Talk
Thomas Norman DamTitle: The SpinBoson model in the strong interaction limit Abstract: The SpinBoson model is a model from QFT which describes a two level system coupled to a scalar field. In this talk, I will present new results about the strong interaction limit of the massive SpinBoson model. As the interaction approaches infinity, one can under very general assumptions describe the asymptotics of the resolvent (in a suitable sense), the ground state energy and the ground state eigenvector. One application of these results is to show the existence of a non degenerate exited state in the strong interaction limit and prove that the energy of the excited state converges to the energy of the ground state. If time allows, I will also talk about the strategy to prove the above mentioned results. This is joint work with Jacob Schach Møller. Atsuhide IshidaTitle: Nonexistence of the wave operators for the repulsive Hamiltonians Abstract: We consider the quantum systems described by the Schroedinger equation equipped with socalled repulsive part. In this quantum system, we can see the characteristic property in which the free dynamics of the particle disperse in an exponential order in time. I will report in this talk that we can find a counter example of the slow decaying interaction potential such that the wave operators do not exist and we come to conclusion of the borderline between the shortrange and longrange. Shanshan LiTitle: Continuous Time Quantum Walks in finite Dimensions Abstract: We consider the quantum search problem with a continuous time quantum walk for networks of finite spectral dimension of the network Laplacian. For general networks of fractal (integer or noninteger) dimension, for which in general the fractal dimension is not equal to the spectral dimension, it suggests that the spectral dimension is the scaling exponent that determines the computational complexity of the search. Our results are consistent with those of Childs and Goldstone [Phys. Rev. A 70 (2004), 022314] for lattices of integer dimension. For general fractals, we find that the Grover limit of quantum search can be obtained whenever the spectral dimension is larger than four. This complements the recent discussion of meanfield networks by Chakraborty et al. [Phys. Rev. Lett. 116 (2016), 100501] showing that for all those networks spatial search by quantum walk is optimal. 
Fernando BrandaoTitle: Quantum Approximate Markov Chains and the Locality of Entanglement Spectrum Abstract: In this talk I will show that quantum manybody states satisfying an area law for entanglement have a local entanglement spectrum, i.e. the entanglement spectrum can be approximated by the spectrum of a local model acting on the boundary of the region. The result follows from a version of the HammersleyClifford Theorem (which states that classical Gibbs states are equivalent to Markov networks) for quantum approximate Markov chains. In particular I'll argue that those are in onetoone correspondence to 1D quantum Gibbs states. 
All special session talks will take place in the Skiles building.
Graphs  New topics  Q.I.  Random  Manybody  ⇈  

Room  Skiles 006  Skiles 202  Skiles 268  Skiles 005  Skiles 249  
2:00pm  Pavel ExnerTitle: Singular Schrödinger operators with interactions supported by sets of codimension one Abstract: In this talk we discuss Schr\"odinger operators with a singular `potentials' supported by a subsets $\Gamma$ of a configuration space having codimension one. Some of them can be formally written as $\Delta\alpha \delta(x\Gamma)$ with $\alpha>0$, where $\Gamma$ is a manifold in~$\mathbb{R}^d$, but we introduce also more singular interactions like $\delta'$ as well as the most general ones parametrized by a family of four function on $\Gamma$. We discuss relations between the spectra of these operators and the geometry of $\Gamma$ using, in particular, inequalities between operators corresponding to different `potentials'.  Martin FraasTitle: Perturbation Theory of NonDemolition Measurements Abstract: In a nondemolition measurement an observable on a quantum system is measured through a direct measurement on a sequence of probes subsequently interacting with the system. Recent interest in developing a theory of this process originates in the photon counting experiments of Haroche. Mathematically the problem is equivalent to the study of statistics of long products of completely positive maps  which all commute in the nondemolition case. I will describe a mathematical theory of nondemolition measurements for observables with arbitrary spectra, and a theory describing the process for small Hamiltonian perturbations of the nondemolition case. The talk is based on joint works with M. Ballesteros, N. Crawford, J. Fröhlich and B. Schubnel.  Mario BertaTitle: Multivariate Trace Inequalities Abstract: We prove several trace inequalities that extend the GoldenThompson and the ArakiLiebThirring inequality to arbitrarily many matrices. In particular, we strengthen Lieb’s triple matrix inequality. As an example application of our four matrix extension of the GoldenThompson inequality, we prove remainder terms for the monotonicity of the quantum relative entropy and strong subadditivity of the von Neumann entropy in terms of recoverability. We find the first explicit remainder terms that are tight in the commutative case. Our proofs rely on complex interpolation theory as well as asymptotic spectral pinching, providing a transparent approach to treat generic multivariate trace inequalities.  Houssam Abdul RahmanTitle: Entanglement and Transport in the disordered Quatum XY chain. Abstract: For a class of disordered Quantum XY chains, we prove that the dynamical entanglement of a broad class of product states satisfies a constant bound. Corollaries include area laws for eigenstates and thermal states. These results correspond to the absence of information transport. We also present and discuss some new results about the particle number transport and the energy transport in the disordered XY chain. We will draw the relation between these results and the notion of Manybody localization.  Christian HainzlTitle: Spectral theoretic aspects of the BCS theory of superconductivity Abstract: The critical temperature in the BCS theory of superconductivity, in the presence of external fields, is determined by a linear twobody operator. I present the corresponding operator and its properties in the case of bounded potentials as well as in the case of a constant external magnetic field.  
2:30pm  Cesar de OliveiraTitle: Approximations of Neumann nonuniformly collapsing strips Abstract: Consider the Neumann Laplacian in the region below the graph of $\varepsilon g(x)$ for smooth $g: [a,\infty) \to (0,\infty)$ and diverging $\lim_{x\to\infty}g(x)=\infty$. The effective operator as $\varepsilon \to 0$ is found to have Robin boundary conditions at $a$. Then we recover such effective operator through suitable uniformly collapsing regions as~$\varepsilon \to 0$; in such approach, we have (roughly) got norm resolvent convergence for~$g$ diverging less than exponential and strong resolvent convergence otherwise.  Emil ProdanTitle: A geometric identity for index theory Abstract: The index theorem for the Hall conductivity in 2dimensions given by Bellissard at al [J. Math. Phys. 1994] relies on a remarkable geometric identity discovered by Alain Connes just a few years before. Relatively recently, this geometric identity was extended to higher dimensions, enabling index theorems for certain nonlinear transport coefficients. This in turn confirmed the stability agains strong disorder of various invariants for topological insulators. In this talk I will describe the geometrical principles behind these generalizations.  Debbie LeungTitle: Embezzlement of entanglement, conservation laws, and nonlocal games Abstract: Consider two remote parties Alice and Bob, who share quantum correlations in the form of a pure entangled state. Without further interaction, the 'Schmidt coefficients' of the entangled state are invariant; in particular, the amount of entanglement is conserved. van Dam and Hayden found that reordering these coefficients (corresponding to allowed local operations) can effect an apparent violation of the conservation law nearly perfectly, a phenomenon called 'embezzlement'. We discuss how the same mathematics can explain coherent manipulation of spins in NMR and other approximate violation of conservation laws. We show how this phenomenon gives rise to a quantum generalization of nonlocal games that cannot be won with finite amount of entanglement. (Joint work with Ben Toner, John Watrous and Jesse Wang.)  Dhriti DolaiTitle: Spectral Statistics of Random Schroedinger Operators with NonErgodic Random Potential Abstract: It is known from earlier result of GordonJaksicMolchanovSimon [1], that the spectrum of the random Schrodinger operators with unbounded potentials (non stationary) is pure point. Recently we obtain the eigenvalue statistics for this model and it is turn out that the statistics is Poisson. It is an analogous of Minami’s work on stationary potential [2]. This is a joint work with Anish Mallick. References [1] Gordon, Y. A; Jaksic, V; Molchanov, S; Simon, B: Spectral properties of random Schrodinger operators with unbounded potentials, Comm. Math. Phys. 157(1), 2350, 1993. [2] Minami, Nariyuki: Local Fluctuation of the Spectrum of a Multidimensional Anderson Tight Binding Model, Commun. Math. Phys. 177(3), 709725, 1996. [3] Dolai, Dhriti; Mallick, Anish: Spectral Statistics of Random Schrdinger Operators with Unbounded Potentials, arXiv:1506.07132 [math.SP]. [4] Combes, JeanMichel; Germinet, Francois; Klein, Abel: Generalized EigenvalueCounting Estimates for the Anderson Model, J Stat Physics. 135(2), 201216, 2009.  Marius LemmTitle: Condensation of fermion pairs in a domain Abstract: We consider a gas of fermions at zero temperature and low density, interacting via a microscopic two body potential which admits a bound state. The particles are confined to a domain with Dirichlet (i.e. zero) boundary conditions. Starting from the microscopic BCS theory, we derive an effective macroscopic GrossPitaevskii (GP) theory describing the condensate of fermion pairs. The GP theory also has Dirichlet boundary conditions. Along the way, we prove that the GP energy, defined with Dirichlet boundary conditions on a bounded Lipschitz domain, is continuous under interior and exterior approximations of that domain. This is joint work with Rupert L. Frank and Barry Simon.  
3:00pm  Claudio CacciapuotiTitle: Existence of Ground State for the NLS on Starlike Graphs Abstract: We consider a nonlinear Schrödinger equation (NLS) on a Starlike graph (a graph composed by a compact core to which a finite number of halflines are attached). At the vertices of the graph interactions of deltatype can be present and an overall external potential is admitted. Our goal is to show that the NLS dynamics on a starlike graph admits a ground state of prescribed mass $m$ under mild and natural hypotheses. By ground state of mass $m$ we mean a minimizer of the NLS energy functional constrained to the manifold of mass ($L^2$norm) equal to $m$. When existing, the ground state is an orbitally stable standing wave for the NLS evolution. We prove that a ground state exists whenever the quadratic part of the energy admits a simple isolated eigenvalue at the bottom of the spectrum (the linear ground state) and $m$ is sufficiently small. This is a major generalization of a result previously obtained for a graph with a single vertex (a star graph) with a delta interaction in the vertex and without potential terms. The main tools of the proof are concentrationcompactness and bifurcation techniques. This is a joint work in collaboration with Domenico Finco and Diego Noja.  Rainer DickTitle: Dressing up for length gauge: Mathematical aspects of a debate in quantum optics Abstract: A debate about the correct form of the interaction Hamiltonian in quantum optics has been going on since Lamb’s investigation of optical line shapes in 1952. Surprisingly, the debate has never been settled, but rather intensified in recent years with the observation of phenomena on atomic time scales in attosecond spectroscopy. In short, the debate concerns the description of matterphoton interactions through vector potentials (“velocity gauge”) or electric fields (“length gauge”) in the Schrödinger equation. Observational evidence is inconclusive, since the observationally preferred interaction terms depend on observed systems and parameters. Indeed, more experimental observations seem to favor the length gauge, which is surprising from a fundamental theory perspective. I will review the problem both from a theoretical and an experimental perspective, and then point out that the underlying transformation between velocity gauge and length gauge is actually an incomplete gauge transformation which should rather be addressed as a basic dressing operation for the Schrödinger field. This observation and a study of the coupled SchrödingerMaxwell system will help us to understand why predictions in velocity gauge and length gauge differ, and why length gauge may be preferred in quantum optical systems.  Beth RuskaiTitle: Extreme Points of Unital Quantum Channels Abstract: Several new classes of extreme points of unital and tracepreserving completely positive (CP) maps are analyzed. One class is not extreme in either the convex set of unital CP maps or the set of tracepreserving CP maps and is factorizablle. Another class is extreme for both the set of unital CP maps and the set of tracepreserving CP maps, except for certain critical parameters. For those parameters the linear dependence of the matrices in the Choi product condition are associated with representations of the symmetric group.  Milivoje LukicTitle: KdV equation with almost periodic initial data Abstract: The KdV equation is known to be integrable for some classes of initial data, such as decaying, periodic, and finitegap quasiperiodic. In this talk, we will describe recent progress for almost periodic initial data, centered around a conjecture of Percy Deift that the solution is almost periodic in time. We will discuss the proof of existence, uniqueness, and almost periodicity in time, in the regime of absolutely continuous and sufficiently 'thick' spectrum. In particular, this result proves Deift's conjecture for small analytic quasiperiodic initial data with Diophantine frequency. The talk is based on joint work with Ilia Binder, David Damanik, and Michael Goldstein.  Marcello PortaTitle: Mean field evolution of fermionic systems Abstract: In this talk I will discuss the dynamics of interacting fermionic systems in the mean field regime. Compared to the bosonic case, fermionic mean field scaling is naturally coupled with a semiclassical scaling, making the analysis more involved. As the number of particles grows, the quantum evolution of the system is expected to be effectively described by HartreeFock theory. The next degree of approximation is provided by a classical effective dynamics, corresponding to the Vlasov equation. I will consider initial data which are close to quasifree states, at zero (pure states) or at positive temperature (mixed states), with an appropriate semiclassical structure. Under mild regularity assumptions on the interaction potential, I will show that the time evolution of such initial data stays close to a quasifree state, with reduced oneparticle density matrix given by the solution of the timedependent HartreeFock equation. The result can be extended to Coulomb interactions, under the assumption that the solution of the timedependent HartreeFock equation preserves the semiclassical structure of the initial data. If time permits, the convergence from the timedependent HartreeFock equation to the Vlasov equation will also be discussed. The results hold for all semiclassical times, and give effective bounds on the rate of convergence towards the effective dynamics as the number of particles goes to infinity.  
3:30pm  Coffee Break (in CULC)  
4:00pm  Zhiqin LuTitle: Ground State of Quantum Layers Abstract: I will give a survey of the existence of ground state of quantum layers in this talk, and I will also present some new results and discuss the relation of this spectrum problem with differential geometry. Some of the results are joint with Julie Rowlett and David Krejcirik.  Vit JakubskyTitle: On dispersion of wave packets in Dirac materials Abstract: We show that a wide class of quantum systems with translational invariance can host dispersionless, solitonlike, wave packets. We focus on the settings where the effective, twodimensional Hamiltonian acquires the form of Dirac operator. The proposed framework for construction of the dispersionless wave packets is illustrated on systems with topologically nontrivial effective mass. Our analytical predictions are accompanied by a numerical analysis and possible experimental realizations are discussed.  Mark WildeTitle: Universal Recoverability in Quantum Information Abstract: The quantum relative entropy is well known to obey a monotonicity property (i.e., it does not increase under the action of a quantum channel). Here we present several refinements of this entropy inequality, some of which have a physical interpretation in terms of recovery from the action of the channel. The recovery channel given here is explicit and universal, depending only on the channel and one of the arguments to the relative entropy. Time permitted, we discuss several application to the 2nd law of thermodynamics, uncertainty relations, and Gaussian quantum information.  Tatyana ShcherbynaTitle: Local regime of 1d random band matrices Abstract: Random band matrices (RBM) are natural intermediate models to study eigenvalue statistics and quantum propagation in disordered systems, since they interpolate between meanfield type Wigner matrices and random Schrodinger operators. In particular, RBM can be used to model the Anderson metalinsulator phase transition (crossover) even in 1d. In this talk we will discuss an application of the supersymmetric method (SUSY) to the analysis of the bulk local regime of some specific types of RBM. We present rigorous SUSY results about the crossover for 1d RBM on the level of characteristic polynomials, as well as some progress in studying of the density of states and usual second correlation function.  Michele CorreggiTitle: Local Density Approximation for the Almostbosonic Anyon Gas Abstract: We study a oneparameter onebody energy functional with a selfconsistent magnetic field, which describes a quantum gas of almostbosonic anyons in the averagefield approximation. For the homogeneous gas we prove the existence of the thermodynamic limit of the energy at fixed effective statistics parameter and the independence of such a limit from the shape of the domain. This result is then used in a local density approximation to derive an effective ThomasFermi like model for the trapped anyon gas in the limit of a large effective statistics parameter (i.e., "lessbosonic" anyons). Joint work with D. Lundholm, N. Rougerie  
4:30pm  Hiroaki NiikuniTitle: Schrödinger operators on a zigzag supergraphenebased carbon nanotube Abstract: In this talk, we study the spectrum of a periodic Schrödinger operator on a zigzag super carbon nanotube, which is a generalization of thezigzag carbon nanotube. We prove that its absolutely continuous spectrum has the band structure.Moreover, we show that its eigenvalues with infinite multiplicities consisting ofthe Dirichlet eigenvalues and points embedded in the spectral band for some corresponding Hill operator. We also give the asymptotics for the spectral band edges.  Brian SwingleTitle: Tensor networks, entanglement, and geometry Abstract: Tensor networks are entanglementbased tools which are useful for representing quantum manybody states, especially thermal states of local Hamiltonians. I will discuss some recent results constructing tensor networks for a wide variety of states of quantum matter. I will also briefly describe recent conjectures relating tensor networks and entanglement to the emergence of quantum gravity via the AdS/CFT correspondence. Based in part on 1607.05753, 1602.02805, and 1407.8203 with John McGreevy and Shenglong Xu.  Jeongwan HaahTitle: Local Approximate Quantum Error Correction Abstract: We study the fundamental limits on reliably storing quantum information in lattices of qubits by deriving tradeoﬀ bounds for approximate quantum error correcting codes. We introduce a notion of local approximate correctability and code distance, and give a number of equivalent formulations thereof, generalizing error correction criteria in exact settings. Our tradeoﬀ bounds relate the spatial dimension of the lattice, the number of physical qubits, the number of encoded qubits, the code distance, the accuracy parameter that quantiﬁes how well erasure can be recovered, and the locality parameter that speciﬁes the length scale at which the recovery operates. Connection to the topological order will be discussed. Joint work with S. Flammia, M. Kastoryano, and I. Kim.  Joe ChenTitle: Spectral decimation and its application to spectral analysis on infinite fractal lattices Abstract: The method of spectral decimation originated from Rammal and Toulouse in the 80s, and has since been developed to tackle spectral problems on selfsimilar fractals by Bellissard, Fukushima, Shima, Malozemov, Teplyaev, etc. In this talk we present two concrete spectral problems on infinite fractal lattices which are inspired by the study of quasiperiodic and random Schrodinger operators. In both problems, we use spectral decimation in an essential way, and reduce the problem to the analysis of a certain 1dimensional complex dynamical system. We hope that these models can help enlighten the mechanisms behind the spectral properties of more complicated Schrodinger operators. 1) On the integer halfline ($\mathbb{Z}_+$) endowed with a fractal selfsimilar Laplacian parametrized by a single parameter $p\in (0,1)$, we prove that the Laplacian spectrum is purely singularly continuous whenever $p\neq \frac{1}{2}$. (If $p=\frac{1}{2}$ one recovers the usual Laplacian on $\mathbb{Z}_+$, whose spectrum is absolutely continuous.) To our knowledge this may be the simplest toy model for exhibiting purely singularly continuous spectrum. 2) On the infinite Sierpinski gasket lattice (SGL), we establish an exponential decay of the resolvent associated with the Laplace or Schrodinger operator, based on spectral decimation and a heat kernel upper estimate. This leads to a proof of Anderson localization on SGL by the methods of SimonWolff and AizenmanMolchanov. This is based on joint works with S. Molchanov (UNCCharlotte) and A. Teplyaev (UConn).  Rupert FrankTitle: Derivation of an effective evolution equation for a strongly coupled polaron Abstract: Fröhlich's polaron Hamiltonian describes an electron coupled to the quantized phonon field of an ionic crystal. We show that in the strong coupling limit the dynamics of the polaron is approximated by an effective nonlinear partial differential equation due to Landau and Pekar, in which the phonon field is treated as a classical field. The talk is based on joint works with B. Schlein and with Z. Gang.  
5:00pm  Petr SieglTitle: Nonselfadjoint graphs Abstract: On finite metric graphs, we consider Laplace operators subject to various classes of nonselfadjoint boundary conditions imposed at graph vertices. We investigate spectral properties, existence of a Riesz basis of projectors and similarity transforms to selfadjoint Laplacians. Among other things, we describe a simple way to relate the similarity transforms between Laplacians on certain graphs with elementary similarity transforms between matrices defining the boundary conditions. The talk is based on: [1] A. Hussein, D. Krejcirik and P. Siegl: Nonselfadjoint graphs, Transactions of the AMS, 367, (2015) 29212957.  Volkher ScholzTitle: Matrix product approximations to multipoint functions in twodimensional conformal field theory Abstract: Matrix product states (MPS) illustrate the suitability of tensor networks for the description of interacting manybody systems: ground states of gapped 1D systems are approximable by MPS as shown by Hastings [J. Stat. Mech. Theor. Exp., P08024 (2007)]. In contrast, whether MPS and more general tensor networks can accurately reproduce correlations in critical quantum systems, respectively quantum field theories, has not been established rigorously. Ample evidence exists: entropic considerations provide restrictions on the form of suitable Ansatz states, and numerical studies show that certain tensor networks can indeed approximate the associated correlation functions. Here we provide a complete positive answer to this question in the case of MPS and 2D conformal field theory: we give quantitative estimates for the approximation error when approximating correlation functions by MPS. Our work is constructive and yields an explicit MPS, thus providing both suitable initial values as well as a rigorous justification of variational methods.  Peter PicklTitle: Derivation of the MaxwellSchrödinger Equations from the PauliFierz Hamiltonian Abstract: We consider the spinless PauliFierz Hamiltonian which describes a quantum system of nonrelativistic identical particles coupled to the quantized electromagnetic field. We study the time evolution in a meanfield limit where the number N of charged particles gets large while the coupling to the radiation field is rescaled by 1/√N. At time zero we assume that almost all charged particles are in the same onebody state (a BoseEinstein condensate) and we assume also the photons to be close to a coherent state. We show that at later times and in the limit N > ∞ the charged particles as well as the photons exhibit condensation, with the time evolution approximately described by the MaxwellSchrödinger system, which models the coupling of a nonrelativistic particle to the classical electromagnetic field.  
5:30pm  Boris GutkinTitle: Quantum chaos in manyparticle systems Abstract: Upon quantisation, systems with classically chaotic dynamics exhibit universal spectral and transport properties effectively described by Random Matrix Theory. Semiclassically this remarkable phenomenon can be attributed to the existence of pairs of classical orbits with small action differences. So far, however, the scope of the theory has, by and large, been restricted to singleparticle systems. I will discuss an extension of this program to chaotic systems with a large number of particles. The crucial step is introducing a twodimensional symbolic dynamics which allows an effective representation of periodic orbits in manyparticle chaotic systems with local interactions. By using it we show that for a large number of particles the dominant correlation mechanism among periodic orbits essentially differs from the one of the singleparticle theory. Its implications on spectral properties of manyparticle quantum systems will be discussed as well.  Nicolas RougerieTitle: Rigidity of the Laughlin liquid Abstract: The Laughlin state is a welleducated ansatz for the ground state of 2D particles subjected to large magnetic fields and strong interactions. It is of importance to understand the rigidity of its response to perturbations. Indeed, this is a crucial ingredient in the Fractional Quantum Hall Effect, where the Laughlin state is the cornerstone of our current theoretical understanding. In this talk we shall consider general Nparticle wave functions that have the form of a product of the Laughlin state and an analytic function of the N variables. This is the most general form of a wave function that can arise through a perturbation of the Laughlin state by external potentials or impurities, while staying in the lowest Landau level and maintaining the strong correlations of the original state. We show that the perturbation can only shift or lower the 1particle density but nowhere increase it above a maximum value. Regardless of the analytic prefactor, the density satisfies the same bound as the Laughlin function itself in the limit of large particle number. Consequences of this incompressibility bound for the response of the Laughlin state to external fields will be discussed. joint work with Elliott H. Lieb and Jakob Yngvason 
Graphs  New topics  Q.I.  Random  Manybody  ⇈  

Room  Skiles 006  Skiles 202  Skiles 268  Skiles 005  Skiles 249  
2:00pm  James KennedyTitle: Eigenvalue estimates for quantum graphs Abstract: A classical problem in the analysis of (partial) differential operators such as the Laplacian on domains or manifolds is to understand how their eigenvalues depend on the underlying geometry of the object on which they are defined. This dependence can take various forms, such as asymptotics or trace formulae, but we will be interested in bounds on the (low) eigenvalues of the operator. A basic example of this is the FaberKrahn inequality, which states that the first eigenvalue of the Dirichlet Laplacian is smallest among all domains with given volume when the domain is a ball. Interest in problems of this nature on metric graphs, which in the prototype case simply concerns estimating the eigenvalues the Laplacian with Kirchhoff conditions at the vertices, seems only to have developed in the last couple of years (with a few notable exceptions, such as works of Nicaise and Friedlander). This is also at odds with the relatively welldeveloped parallel body of literature on the eigenvalues of discrete and normalised Laplacians. This will be a first attempt to provide a natural framework for such eigenvalue estimates in the easiest case of the spectral gap of the Kirchhoff Laplacian: which geometric and algebraic quantities of a graph, such as total length, diameter, number of edges or vertices, connectivity, Betti number etc. enable one to control the eigenvalue(s), and how? Which bounds are possible? We shall attempt to demonstrate that on the one hand such questions can be surprisingly subtle. But on the other, one can come a long way armed with little more than elementary variational principles, a workhorse of the PDE theory which becomes very powerful on graphs, but seems to have been largely overlooked by much of the graph theory community until recently. This talk is based on joint, ongoing work with Gregory Berkolaiko, Pavel Kurasov, Gabriela Malenova and Delio Mugnolo.  Anushya ChandranTitle: Heating in periodically driven Floquet systems Abstract: Periodically driven quantum systems (Floquet systems) do not have a conserved energy. Thus, statistical mechanical lore holds that if they thermalize, it must be to infinite temperature. I will first show this holds in undriven systems that satisfy the eigenstate thermalization hypothesis. I will then present two counterexamples to infinite temperature heating. The first is the bosonic O(N) model at infinite N, in which the steady states are paramagnetic and have nontrivial correlations. The second is the Clifford circuit model, which can fail to heat depending on the choice of circuit elements. The resulting steady states can then be localized or delocalized but not ergodic. Such models shed light on the nature of interacting Floquet localization.  Isaac KimTitle: Markovian marginals Abstract: We introduce the notion of so called Markovian marginals, which is a natural framework for constructing solutions to the quantum marginal problem. We show that a set of reduced density matrices on overlapping supports necessarily has a global state that is compatible with all the given reduced density matrices, provided that they satisfy certain (nonlinear) local constraints.  Vojkan JaksicTitle: Adiabatic theorems and Landauer's principle in quantum statistical mechanics Abstract: The Landauer principle asserts that the energy cost of erasure of one bit of information by the action of a thermal reservoir in equilibrium at temperature T is never less than k_BT log 2. We discuss Landauer's principle for quantum statistical models describing a finite level quantum system S coupled to an infinitely extended thermal reservoir R and link the saturation of Landauer's bound to adiabatic theorems in quantum statistical mechanics (for states and relative entropy). Furthermore, by extending the adiabatic theorem to Renyi's relative entropy, we extend the Landauer principle to the level the Full Counting Statistics (FCS) of energy transfer between S and R. This allows to elucidate the nature of Landauer's principle FCS fluctuations. This talk is based on joint works with Tristan Benoist, Martin Fraas, and ClaudeAlain Pillet.  Ian JauslinTitle: Ground state construction of bilayer graphene Abstract: We consider a model of weaklyinteracting electrons in bilayer graphene. Bilayer graphene is a 2dimensional crystal consisting of two layers of carbon atoms in a hexagonal lattice. Our main result is an expression of the free energy and twopoint Schwinger function as convergent power series in the interaction strength. In this talk, I discuss the properties of the noninteracting model, and exhibit three energy regimes in which the energy bands are qualitatively different. I then sketch how this decomposition may be used to carry out the renormalization group analysis used to prove our main result. This is joint work with Alessandro Giuliani.  
2:30pm  Ram BandTitle: Quantum graphs which optimize the spectral gap Abstract: A finite discrete graph is turned into a quantum (metric) graph once a finite length is assigned to each edge and the onedimensional Laplacian is taken to be the operator. We study the dependence of the spectral gap (the first positive Laplacian eigenvalue) on the choice of edge lengths. In particular, starting from a certain discrete graph, we seek the quantum graph for which an optimal (either maximal or minimal) spectral gap is obtained. We fully solve the minimization problem for all graphs. We develop tools for investigating the maximization problem and solve it for some families of graphs. The talk is based on a joint work with Guillaume Levy.  Pieter NaaijkensTitle: Operator algebras and data hiding in topologically ordered systems Abstract: The total quantum dimension is an invariant of topological phases, related to the anyonic excitations a topologically ordered state supports. In this talk I will discuss the total quantum dimension in the thermodynamic limit of topologically ordered quantum spin systems. In particular, I will discuss how the anyons can be used to hide data in the state. While not a practical way of data hiding, it sheds new light on the total quantum dimension: in particular, I will outline how deep results from operator algebra (and subfactors in particular) can be used to quantify how much information can be hidden, and how this is related to the quantum dimension. Joint work with Leander Fiedler and Tobias Osborne.  Ke LiTitle: Discriminating quantum states: the multiple Chernoff distance Abstract: Suppose we are given n copies of one of the quantum states {rho_1,..., rho_r}, with an arbitrary prior distribution that is independent of n. The multiple hypothesis Chernoff bound problem concerns the minimal average error probability P_e in detecting the true state. It is known that P_e~exp(En)decays exponentially to zero. However, this error exponent E is generally unknown, except for the case r=2. In this talk, I will give a solution to the longstanding open problem of identifying the above error exponent, by proving Nussbaum and Szkola's conjecture that E=min_{i eq j} C(rho_i, rho_j). The righthand side of this equality is called the multiple quantum Chernoff distance, and C(rho_i,rho_j):=max_{0 <= s <= 1} {log Tr rho_i^s rho_j^(1s)} has been previously identified as the optimal error exponent for testing two hypotheses, rho_i versus rho_j. The main ingredient of our proof is a new upper bound for the average error probability, for testing an ensemble of finitedimensional, but otherwise general, quantum states. This upper bound, up to a statesdependent factor, matches the multiplestate generalization of Nussbaum and Szkola's lower bound. Specialized to the case r=2, we give an alternative proof to the achievability of the binaryhypothesis Chernoff distance, which was originally proved by Audenaert et al.  Abel KleinTitle: Eigensystem multiscale analysis for Anderson localization in energy intervals I Abstract: We perform an eigensystem multiscale analysis for proving localization (pure point spectrum with exponentially decaying eigenfunctions, dynamical localization) for the Anderson model in an energy interval. In particular, it yields localization for the Anderson model in a nonempty interval at the bottom of the spectrum. This eigensystem multiscale analysis in an energy interval treats all energies of the finite volume operator at the same time, establishing level spacing and localization of eigenfunctions with eigenvalues in the energy interval in a fixed box with high probability. In contrast to the usual strategy, we do not study finite volume Green's functions. Instead, we perform a multiscale analysis based on finite volume eigensystems (eigenvalues and eigenfunctions). In any given scale we only have decay for eigenfunctions with eigenvalues in the energy interval, and no information about the other eigenfunctions. For this reason, going to a larger scale requires new arguments that were not necessary in our previous eigensystem multiscale analysis for the Anderson model at high disorder, where in a given scale we have decay for all eigenfunctions.  Phan Thanh NamTitle: Stability of 2D focusing manyboson systems Abstract: We consider a 2D quantum system of N bosons, interacting via a pair potential of the form $N^{2\beta1}w(N^\beta (xy))$. In the focusing case $w<0$, the stability of the second kind of the system is not obvious. We will show that if the system is trapped by an external potential $x^s$ and $\beta<(s+1)/(s+2)$, then the leading order behavior of ground states in the large N limit is described by the corresponding cubic nonlinear Schr\"odinger energy functional. In particular, our result covers the dilute regime $\beta>1/2$, where the range of the interaction is much smaller than the average distance between particles. This is joint work with Mathieu Lewin and Nicolas Rougerie.  
3:00pm  Boris GutkinTitle: Spectral statistics of nearly unidirectional quantum graphs Abstract: Quantum Hamiltonian systems with unidirectional classical dynamics posses a number of intriguing spectral properties. In particular, their energy levels are quasidegenerate and have anomalous spectral statistics. We look at the unidirectional quantum graphs as a toy model for this phenomenon. Their spectrum is doubly degenerate with the same statistics as in the Gaussian Unitary Ensembles of random matrices. However, adding a backscattering at one of the graph's bonds lifts the degeneracies. Based on a random matrix model we derive an analytic expression for the anomalous nearest neighbor distribution between energy levels. As we show the result agrees excellently with the actual statistics in most of the cases. Yet, it exhibits quite substantial deviations for classes of graphs with strong localization of eigenfunctions. The talk is based on the joint work (arXiv:1503.01342) with M. Akila.  Subir SachdevTitle: The SachdevYeKitaev models of nonFermi liquids and black holes Abstract: The SYK models are simple Hamiltonians of fermions with random alltoall interactions. Their ground states largely selfaverage over disorder, and have a gapless excitation spectrum with no quasiparticle structure. They provide a model of nonFermi liquids, and also, remarkably, of black holes in twodimensional antide Sitter space  Graeme SmithTitle: Uniformly additive entropic formulas Abstract: Information theory establishes the fundamental limits on data transmission, storage, and processing. Quantum information theory unites information theoretic ideas with an accurate quantummechanical description of reality to give a more accurate and complete theory with new and more powerful possibilities for information processing. The goal of both classical and quantum information theory is to quantify the optimal rates of interconversion of different resources. These rates are usually characterized in terms of entropies. However, nonadditivity of many entropic formulas often makes finding answers to information theoretic questions intractable. In a few auspicious cases, such as the classical capacity of a classical channel, the capacity region of a multiple access channel and the entanglement assisted capacity of a quantum channel, additivity allows a full characterization of optimal rates. Here we present a new mathematical property of entropic formulas, uniform additivity, that is both easily evaluated and rich enough to capture all known quantum additive formulas. We give a complete characterization of uniformly additive functions using the linear programming approach to entropy inequalities. In addition to all known quantum formulas, we find a new and intriguing additive quantity: the completely coherent information. We also uncover a remarkable coincidencethe classical and quantum uniformly additive functions are identical; the tractable answers in classical and quantum information theory are formally equivalent.  Alexander ElgartTitle: Eigensystem multiscale analysis for Anderson localization in energy intervals II Abstract: We perform an eigensystem multiscale analysis for proving localization (pure point spectrum with exponentially decaying eigenfunctions, dynamical localization) for the Anderson model in an energy interval. In particular, it yields localization for the Anderson model in a nonempty interval at the bottom of the spectrum. This eigensystem multiscale analysis in an energy interval treats all energies of the finite volume operator at the same time, establishing level spacing and localization of eigenfunctions with eigenvalues in the energy interval in a fixed box with high probability. In contrast to the usual strategy, we do not study finite volume Green's functions. Instead, we perform a multiscale analysis based on finite volume eigensystems (eigenvalues and eigenfunctions). In any given scale we only have decay for eigenfunctions with eigenvalues in the energy interval, and no information about the other eigenfunctions. For this reason, going to a larger scale requires new arguments that were not necessary in our previous eigensystem multiscale analysis for the Anderson model at high disorder, where in a given scale we have decay for all eigenfunctions.  Shannon StarrTitle: Robust Bounds for Emptiness Formation Probability for Dimers Abstract: Emptiness formation probability is a measurable quantity associated to a ground state or equilibrium state of a quantum spin system. It was originally promoted by V Korepin. For the XXZ chain, a relation with the 6 vertex model discovered by Lieb allows for robust bounds using the reflection positivity technique. For dimers, emptiness formation probability for a lattice rotated by 45 degrees is more natural. The basic technique applies but there are extra mathematical issues, including discovering a quantum spin system associated to the lattice model. This is joint work with Scott Williams, a student at UAB.  
3:30pm  Coffee Break (in CULC)  
4:00pm  Evans HarrellTitle: Pointwise control of eigenfunctions on quantum graphs Abstract: Pointwise bounds on eigenfunctions are useful for establishing localization of quantum states, and they have implications for the distribution of eigenvalues and for physical properties such as conductivity. In the lowenergy regime, localization is associated with exponential decrease through potential barriers. We adapt the Agmon method to control this tunneling effect for quantum graphs with Sobolev and pointwise estimates. It turns out that as a generic matter, the rate of decay is controlled by an Agmon metric related to the classical LiouvilleGeen approximation for the line, but more rapid decay is typical, arising from the geometry of the graph. In the highenergy regime one expects states to oscillate but to be dominated by a 'landscape function' in terms of the potential and features of the graph. We discuss the construction of useful landscape functions for quantum graphs.  Marco MerkliTitle: Evolution of a twolevel system strongly coupled to a thermal bath Abstract: We consider a quantum process where electric charge, or excitation energy, is exchanged between two agents, and in the presence of a thermal environment. In some chemical processes in biology (photosynthesis), the agentreservoir interaction energy is large, at least of the same size as the agents' energy difference. We present a rigorous analysis of the effective dynamics of the agents in this coupling regime, valid for all times. In particular, we derive a generalization of the Marcus formula from quantum chemistry, predicting the reaction rate. Our generalization shows that by coupling one agent more strongly to the environment than the other one, a significant speedup of the process can be achieved. Our analytic method is based on a resonance expansion of the reduced agent dynamics, cast in the framework of the strongly coupled spinboson system.  Stefan BoettcherTitle: The Renormalization Group Solution of Quantum Walks on Complex Networks Abstract: Replacing the stochastic evolution operator in the master equation of the classical random walk with a unitary operator leads to a spectrum of new phenomena. Such a quantum walk has gain considerable interest in quantum information sciences as it is the "engine" that drives Grover's quantum search to gain a quadratic speedup over classical randomized algorithms. The spreading dynamics on regular lattices already leads to numerous fascinating features, such as localization and violation of Polya's theorem, however, the motion is universally ballistic in all dimensions and reveals little insight about the intricate nature of the quantum dynamics. We use the renormalization group to produce nontrivial, exact results for the asymptotic scaling of the probability density function for quantum walks on various complex networks (Sierpinski, MigdalKadanoff, Hanoi). These elucidate the subtle interplay of quantum effects and internal ("coin") degrees of freedom with the geometry of the network and the spectral properties of the evolution operator by which one can control the behavior.  Jeffrey SchenkerTitle: Localization in the disordered Holstein model Abstract: The Holstein model (in the one particle sector) describes a lattice particle interacting with independent Harmonic oscillators at each site of the lattice. We consider this model with on site disorder in the particle potential. This is proposed a simple model in which it may be possible to test some ideas regarding multi/manybody localization. Provided the oscillator frequency is not too small and the hopping is weak, we are able to prove localization for the eigenfunctions, in particle position and in oscillator Fock space. Some open problems regarding the character of high energy eigenstates will be discussed. (Joint work with Rajinder Mavi.)  Bruno NachtergaeleTitle: Stability of FrustrationFree Ground States of Quantum Lattice Systems Abstract: We study frustrationfree quantum lattice systems with a nonvanishing spectral gap above one or more (infinitevolume) ground states. The ground states are called stable if arbitrary perturbations of the Hamiltonian that are uniformly small throughout the lattice have only a perturbative effect. In the past several years such stability results have been obtained in increasing generality aimed at applications to topological phases. We discuss the works by BravyiHastingsMichalakis and MichalakisZwolak, and some recent extensions of these results to systems with spontaneous symmetry breaking in joint work with Robert Sims and Amanda Young.  
4:30pm  Gueorgui RaykovTitle: Local Eigenvalue Asymptotics of the Perturbed Krein Laplacian Abstract: I will consider the Krein Laplacian on a regular bounded domain, perturbed by a realvalued multiplier V vanishing on the boundary. Assuming that V has a definite sign, I will discuss the asymptotics of the eigenvalue sequence which converges to the origin. In particular, I will show that the effective Hamiltonian that governs the main asymptotic term of this sequence, is the harmonic Toeplitz operator with symbol V, unitarily equivalent to a pseudodifferential operator on the boundary. This is a joint work with Vincent Bruneau (Bordeaux, France). The partial support of the Chilean Science Foundation Fondecyt under Grant 1130591 is gratefully acknowledged.  Hal TasakiTitle: What is thermal equilibrium and how do we get there? Abstract: We discuss the foundation of equilibrium statistical mechanics in terms of isolated macroscopic quantum systems. We shall characterize thermal equilibrium based on "typicality" picture and a largedeviation type consideration. We then present a simple (and hopefully realistic) condition based on the notion of effective dimension which guarantees that a nonequilibrium initial state evolves into the thermal equilibrium.  Michael WalterTitle: Entanglement in Random Tensor Networks Abstract: Motivated by recent research in quantum information and gravity, we study tensor networks with large bond dimension, obtained by contracting random stabilizer states. We find that their bipartite and multipartite entanglement properties are dictated by the geometry of the network and explain how this relates to nonstandard entropy inequalities. We further consider 'holographic' bulkboundary mappings defined by such tensor networks and discuss their properties as quantum subsystem codes. Techniques used include spin models for random tensor averages and a new formula for the third moment of a random stabilizer state.  Per von SoostenTitle: Localizationiin the Hierarchical Anderson Model Abstract: We will consider a hierarchical version of the classical Anderson model on the lattice and present results to the extent that the hierarchical model remains localized throughout its range of parameters. Our argument is based on renormalization ideas that transform the Hamiltonian into a regime of high disorder. This talk is based on joint work with Simone Warzel.  Jan Philip SolovejTitle: Zero modes for Dirac operators with magnetic links Abstract: The occurence of zero modes for Dirac operators with magnetic fields is the cause of break down of stability of matter for charged systems. All known examples of magnetic fields leading to zero modes are geometrically very complex. In order to better understand this geometry I will discuss singular magnetic fields supported on a finite number of possibly interlinking field lines (magnetic links). I will show that the occurence of zero modes is intimately connected to the twisting and interlinking of the field lines. The result will rely on explicitly calculating appropriate spectral flows for the Dirac operators. This is joint work with Fabian Portmann and Jeremy Sok.  
5:00pm  Kenichi ItoTitle: Branching form of the resolvent at threshold for discrete Laplacians Abstract: We compute an explicit expression of the resolvent around the threshold zero for an ultrahyperbolic operator of signature $(p,q)$, which includes the Laplacian as a special case. In particular, we classify a branching form of the resolvent; The resolvent has a squareroot singularity if $(p,q)$ is oddeven or evenodd, a logarithm singularity if $(p,q)$ is eveneven, and a dilogarithm singularity if $(p,q)$ is oddodd. We apply the same computation scheme to the discrete Laplacian around thresholds embedded in continuous spectrum as well as those at end points, and obtain similar results, presenting a practical procedure to expand the resolvent around these thresholds. This talk is based on a recent joint work with Arne Jensen (Aalborg University).  Paul GoldbartTitle: Universality in transitionless quantum driving Abstract: A timedependent quantum system, if prepared in some instantaneous eigenstate of its Hamiltonian, typically exhibits nonadiabaticity: it develops quantum amplitudes to be found in orthogonal instantaneous eigenstates. When the time dependence is slow, these amplitudes are small, as seen explicitly, e.g., in the LandauMajoranaZener model. Berry (2009) has shown how to construct Hamiltonian terms that stifle nonadiabaticity, regardless of the pace of the time dependence of the original Hamiltonian: this is transitionless quantum driving. We discuss the extension of transitionless quantum driving to systems possessing exact degeneracies amongst their instantaneous energy eigenvalues and, as a result, exhibit the WilczekZee (1984) nonabelian extension of Berry's connection (1984). We also discuss how a particular stifling term serves to protect adiabaticity for a surprisingly large family of systems. We conclude by mentioning some settings in which transitionless quantum driving should be realizable, experimentally. This talk is based on work done with Rafael Hipolito. F. Wilczek and A. Zee (1984) Appearance of gauge structure in simple dynamical systems, Physical Review Letters 52, 21112114. M. V. Berry (2009) Transitionless quantum driving, Journal of Physics A: Mathematical and Theoretical 42, 365303 [9 pages]. M. V. Berry (1984) Quantal phase factors accompanying adiabatic changes, Proceedings of the Royal Society of London Series A 392, 4557. 
Graphs  New topics  Q.I.  Random/Manybody  ⇈  

Room  Skiles 006  Skiles 202  Skiles 268  Skiles 249  
2:00pm  Françoise TrucTitle: Topological Resonances on Quantum Graphs Abstract: In this paper, we try to put the results of Smilansky and al. on "Topological resonances" on a mathematical basis.A key role in the asymptotic of resonances near the real axis for Quantum Graphs is played by the set of metrics for which there exists compactly supported eigenfunctions. We give several estimates of the dimension of this semialgebraic set, in particular in terms of the girth of the graph. The case of trees is also discussed.  Takahiro MorimotoTitle: Classification theory of topological insulators with Clifford algebras and its application to interacting fermions Abstract: The topological classification of noninteracting fermionic ground states is established as the tenfold way. Systems of noninteracting fermions are divided into ten symmetry classes. For each dimension, five out of ten symmetry classes contain nontrivial topological insulators (TIs) or superconductors (TSCs) characterized by Z or Z_2 topological numbers. Later, it was revealed that the noninteracting topological classification Z is unstable to interactions and reduces to Z_8 (Z_16) in the case of 1D (3D) timereversal symmetric TSCs. In this talk, first, we review the classification theory of noninteracting topological insulators in terms of an extension problem of associated Clifford algebras. This enables us to concisely derive the tenfold way classification and also to classify topological crystalline insulators [1]. Then we apply the Clifford algebra approach to the breakdown of the tenfold way in the presence of quartic fermionfermion interactions for any dimension of space [2]. Specifically, we study the effects of interactions on the boundary gapless modes of TIs in terms of boundary dynamical masses. Breakdown of the noninteracting topological classification occurs when the quantum nonlinear sigma models for the boundary dynamical masses favor quantum disordered phases. For the tenfold way, we find that (i) Z_2 is always stable, (ii) Z in even dimensions is always stable, (iii) Z in odd dimensions is unstable and reduces to Z_N that can be identified explicitly for any dimension and any defining symmetries. We also apply our method to the topological crystalline insulator (SnTe) and find the reduction of the noninteracting topological classification Z to Z_8. [1] T. Morimoto, and A. Furusaki, Phys. Rev. B 88, 125129 (2013). . [2] T. Morimoto, A. Furusaki, and C. Mudry, Phys. Rev. B 92, 125104 (2015  Nilanjana DattaTitle: Contractivity properties of a quantum diffusion semigroup Abstract: We consider a quantum generalization of the classical heat equation, and study contractivity properties of its associated semigroup. We prove a Nash inequality and a logarithmic Sobolev inequality for Gaussian states. The former leads to an ultracontractivity result. This in turn implies that the largest eigenvalue and the purity of any state, evolving under the action of the semigroup, decrease inverse polynomially in time, while its entropy increases logarithmically in time. This is joint work with Cambyse Rouze' and Yan Pautrat.  Rafael DucatezTitle: Anderson localization for infinitely many interacting particules under Hartree Fock theory Abstract: We prove the occurrence of Anderson localisation for a system of infinitely many particles interacting with a short range potential, within the ground state HartreeFock approximation. We assume that the particles hop on a discrete lattice and that they are submitted to an external periodic potential which creates a gap in the noninteracting one particle Hamiltonian. We also assume that the interaction is weak enough to preserve a gap. We prove that the meanfield operator has exponentially localised eigenvectors, either on its whole spectrum or at the edges of its bands, depending on the strength of the disorder.  
2:30pm  Jens BolteTitle: Spectra of interacting particles on quantum graphs Abstract: One reason for the success of oneparticle quantum graph models is that their spectra are determined by secular equations involving finitedimensional determinants. In general, one cannot expect this to extend to interacting manyparticle models. In this talk I will introduce twoparticle quantum graph models with interactions that allow one to express eigenfunctions in terms of a Bethe ansatz. From this a secular equation will be determined, and eigenvalues can be calculated numerically. The talk is based on joint work with George Garforth.  Carlos sa de MeloTitle: Effects of spinorbit coupling on the BerezinskiiKosterlitzThouless transition. Abstract: We investigate the BerezinskiiKosterlitzThouless (BKT) transition in a twodimensional (2D) neutral Fermi system with spinorbit coupling (SOC), as a function of the twobody binding energy and a perpendicular Zeeman field [1,2]. By including a generic form of the SOC, as a function of Rashba and Dresselhaus terms, we study the evolution between the equal RashbaDresselhaus (ERD) and the Rashbaonly (RO) cases. We show that in the ERD case, at fixed nonzero Zeeman field, the BKT transition temperature TBKT is increased by the effect of the SOC for all values of the binding energy. We also find a significant increase in the value of the Clogston limit compared to the case without SOC. Furthermore, we demonstrate that the superfluid density tensor becomes anisotropic (except in the RO case), leading to an anisotropic phasefluctuation action that describes elliptic vortices and antivortices, which become circular in the RO limit. This deformation constitutes an important experimental signature for superfluidity in a 2D Fermi system with ERD SOC. Finally, we show that the anisotropic sound velocity exhibit anomalies at low temperatures in the vicinity of quantum phase transitions between topologically distinct uniform superfluid phases. [1] Jeroen P. A. Devreese, Jacques Tempere, and Carlos A. R. Sá de Melo, Phys. Rev. Lett. 113, 165304 (2014). [2] Jeroen P. A. Devreese, Jacques Tempere, and Carlos A. R. Sá de Melo, Physical Review A 92, 043618 (2015).  William SlofstraTitle: Tsirelson's problem and linear system games Abstract: In quantum information, we frequently consider (for instance, whenever we talk about entanglement) a composite system consisting of two separated subsystems. A standard axiom of quantum mechanics states that a composite system can be modeled as the tensor product of the two subsystems. However, there is another less restrictive way to model a composite system, which is used in quantum field theory: we can require only that the algebras of observables for each subsystem commute within some larger subalgebra. Tsirelson's question (which comes in several variants) asks whether the correlations arising from commutingoperator models can always be represented by tensorproduct models. I will give examples of linear system nonlocal games which cannot be played perfectly with tensorproduct strategies, but can be played perfectly with commutingoperator strategies, resolving (one version of) Tsirelson's question in the negative. From these examples, we can also derive other consequences for the theory of nonlocal games, such as the undecidability of determining whether a nonlocal game has a perfect commutingoperator strategy.  Francois HuveneersTitle: A random matrix approach to ManyBody Localization Abstract: The localized phase in interacting systems is usually understood in a perturbative sense, as a robustness of Anderson localization when perturbing away from the noninteracting limit. In this talk, I will present a new approach, relying as much as possible on random matrix theory, which is generally used to describe ergodic systems (cf. ETH). The localized phase emerges then as an instability of the random matrix theory when adding disordered spins. This new view point is especially useful to analyze the influence of ergodic spots on the localized phase: It yields a detailed description of the boundary region near the spot, and naturally leads to the discussion of the stability of the localized phase upon bringing it in contact with a piece of ergodic material. I will also describe how the theory can be tested, and I will show some (preliminary) numerical results. From a joint work with Wojciech De Roeck (arXiv:1608.01815)  
3:00pm  Jon HarrisonTitle: nparticle quantum statistics on graphs Abstract: For particles in three or more dimensions the forms of quantum statistics of indistinguishable particles are either BoseEinstein or FermiDirac corresponding to the two abelian representations of the first homology group of the configuration space. Restricting particles to the plane the fundamental group of the configuration space is the braid group and a new form of particle statistics corresponding to its abelian representations appears, anyon statistics. Restricting the dimension of the space further to a quasionedimensional quantum graph opens new forms of statistics determined by the connectivity of the graph. We develop a full characterization of abelian quantum statistics on graphs which leads to an alternative proof of the structure theorem for the first homology group of the nparticle configuration space. For two connected graphs the statistics are independent of the particle number. On three connected nonplanar graphs particles are either bosons or fermions while in three connected planar graphs they are anyons. Graphs with more general connectivity exhibit interesting mixtures of these behaviors which we illustrate. For example, a graph can be constructed where particles behave as bosons, fermions and anyons depending on the region of the graph that they inhabit. An advantage of this direct approach to analysis of the first homology group is that it makes the physical origin of these new forms of statistics clear. This is work with Jon Keating, Jonathan Robbins and Adam Sawicki at Bristol.  Maksym SerbynTitle: Properties of manybody localized phase: entanglement spec Abstract: Many body localization allows quantum systems to escape thermalization via emergence of extensive number of conserved quantities. I will demonstrate how the existence of these local conserved quantities is manifested in various properties of manybody localized phase. I will demonstrate the powerlaw form of the entanglement spectrum in the MBL phase, which follows from existence of local conserved quantities. I will discuss general implications of this result for variational studies of highly excited eigenstates in manybody localized systems, and show an implementation of a matrixproduct state algorithm which allows us to access the eigenstates of large systems close to the delocalization transition. In addition, I will discuss statistics of matrix elements of local operators and use it to probe delocalization transition.  John ImbrieTitle: Constructive Methods for Localization and Eigenvalue Statistics Abstract: Convergent expansions for eigenvalues and eigenvectors lead to new insights in manybody and singlebody quantum systems with disorder. I will review recent work elucidating the way randomness localizes eigenfunctions, smooths out eigenvalue distributions, and produces eigenvalue separation.  
3:30pm  Coffee Break (in CULC)  
4:00pm  Tracy WeyandTitle: Zeta Functions of the Dirac Operator on Quantum Graphs Abstract: The spectral zeta function generalizes the Riemann zeta function by replacing the sum over integers with a sum over a spectrum. Here we consider the spectrum of the Dirac operator acting on a metric graph. Since all eigenvalues are roots of a secular equation, we can calculate the spectral zeta function by applying the argument principle to a particular contour integral. This will be done first for a rose graph, and then for general graphs with selfadjoint vertex matching conditions. We will also discuss how this function can then be used to compute the spectral determinant.  PoYao ChangTitle: Entanglement negativity in manybody physics Abstract: Entanglement measures are powerful techniques of extracting quantum information in a manybody state. However, most of the entanglement measures focus on a bipartite system in a pure state. To characterize quantum entanglement of a tripartite system in a mixed state, entanglement negativity is proposed. This talk will present the current developments of computing entanglement negativity and their applications. Three methods will be demonstrated: an overlap matrix approach for freefermion systems[1], the conformal field theory approach for a local quantum quench[2], and a surgery method for ChernSimons theories[3]. [1] P.Y. Chang and X. Wen, Phys. Rev. B 93, 195140 (2016). [2] X. Wen, P.Y. Chang and S. Ryu, Phys. Rev. B 92, 075109 (2015). [3] X. Wen, P.Y. Chang and S. Ryu, arXiv:1606.04118.  Carlos OrtizMarreroTitle: Categories and Topological Quantum Computing Abstract: Quantum computation is defined to be any computational model based upon the theoretical ability to manufacture, manipulate, and measure quantum states. (2+1)dimensional topological phases of matter (TPM) promise a route to quantum computation where quantum information is topologically protected against decoherence. In this talk, we will explore the underling mathematical theory that is driving the classification of these TPM. We will mainly concentrate on the algebraic/categorical structure behind such phases and explain where this structure fits in describing TPM. Finally, we will discuss some recent developments in the mathematical classification pertinent to TPM, namely the classification of (pre)modular categories.  Alain JoyeTitle: Representations of CCR describing infinite coherent states Abstract: We investigate the infinite volume limit of quantized photon fields in multimode coherent states. We show that for states containing a continuum of coherent modes, it is natural to consider their phases to be random and identically distributed. The infinite volume states give rise to Hilbert space representations of the canonical commutation relations which are random as well and can be expressed with the help of Itô stochastic integrals. We analyze the dynamics of the infinite coherent state alone and that of open systems consisting of small quantum systems coupled to the infinite coherent state. Under the free field dynamics, the initial phase distribution is shown to be driven to the uniform distribution, and coherences in small quantum systems interacting with the infinite coherent state, are shown to exhibit Gaussian time decay, instead of the exponential decay caused by infinite thermal states. Joint work with Marco Merkli.  
4:30pm  Jiri LipovskyTitle: How to find the effective size of a nonWeyl graph Abstract: We study the asymptotics of the number of resolvent resonances in a quantum graph with attached halflines. It has been proven that in some cases the constant by the leading term of the asymptotics (the effective size of the graph) is smaller than one expects by the Weyl law since some resonances escape to infinity. We show how to find this effective size by the method of pseudoorbit expansion. Furthermore, we prove two theorems on the effective size of certain type of graphs with standard (Kirchhoff) coupling.  Israel KlichTitle: Novel quantum phase transition from bounded to extensive entanglement entropy. Abstract: I will describe a continuous family of frustrationfree Hamiltonians with exactly solvable ground states. We prove that the ground state of our model is nondegenerate and exhibits a novel quantum phase transition from bounded entanglement entropy to a massively entangled state with volume entropy scaling. The ground state may be interpreted as a deformation away from the uniform superposition of colored Motzkin paths, showed by Movassagh and Shor to have a large (squareroot) but subextensive scaling of entanglement into a state with an extensive entropy.  Vern PaulsenTitle: Perfect embezzlement of a Bell State Abstract: Van Dam and Hayden showed that if Alice and Bob each have finite dimensional state spaces, then using local unitary operations and a shared entangled state on some bipartite resource space, with vanishingly small error, they can "appear" to produce an entangled state. Hence, the term "embezzlement". We prove that perfect embezzlement is impossible in this framework even when the shared resource space is allowed to be infinite dimensional. But if one allows the commuting operator model, then one can embezzle perfectly. We then relate this to recent work on the conjectures of Tsirelson and Connes. Finally, we show that this implies a perfect commuting strategy for a game of Regev and Vidick which has no perfect bipartite strategy.  Chris Laumann Title: Manybody localization in meanfield quantum glasses Abstract: The central assumption of statistical mechanics is that interactions between particles establish local equilibrium. Isolated quantum systems, however, need not equilibrate; for example, this happens when sufficient quenched disorder causes localization. Unfortunately there are few tractable models to study this phenomenon. In this talk, I will briefly review the basic phenomenology of manybody localization and then introduce a family of meanfield spin glass models known to be tractable: the quantum pspin models. I will argue that the quantum dynamics in these models exhibits a localized phase that cannot be detected in the canonical thermodynamic analysis. The properties of the phase and the mobility edge which separates it from the ergodic regime can be analytically estimated using several techniques. The localized eigenstates concentrate on clusters within Hilbert space which exhibit distinct magnetization patterns as characterized by an eigenstate variant of the EdwardsAnderson order parameter. Based on joint work with: C. L. Baldwin, A. Pal, A. Scardicchio  
5:00pm  Vladimir RabinovichTitle: Essential spectrum of Schrödinger operators with no periodic potentials on periodic graphs Abstract: We consider Schrödinger operators $H$ with bounded uniformly continuous electric potentials on periodic graphs $\Gamma$ provided by the standard KirchhoffNeumann conditions at every vertex. Following to [14] we define for $H$ a family of limit operators and we show that the essential spectrum of $H$ is the union of the spectra of all limit operators. We give applications of this result to calculations of the essential spectra of Schr\"{o}dinger operators on periodic graphs with periodic electric potentials perturbed by a slowly oscillating at infinity terms. Bibliography 1: V.S.Rabinovich, S. Roch, B.Silbermann, Limit Operators and its Applications in the Operator Theory, In ser. Operator Theory: Advances and Applications, vol 150, ISBN 3764370815, Birkhäuser Velag, 2004, 392 pp. 2: V. Rabinovich, Essential spectrum of perturbed pseudodifferential operators. Applications to the Schrödinger, KleinGordon, and Dirac operators, Russian Journal of Math. Physics, Vol.12, No.1, 2005, p. 6280 3: V.S. Rabinovich, S. Roch, The essential spectrum of Schrödinger operators on lattice, Journal of Physics A, Math. Theor. 39 (2006) 83778394 4: V.S. Rabinovich, S. Roch, Essential spectra of difference operators on $\mathbb{Z}^n$periodic graphs, J. of Physics A: Math. Theor. ISSN 17518113, 40 (2007) 1010910128  Shina TanTitle: Exact relations for twocomponent Fermi gases with contact interactions Abstract: Ultracold atomic gases created in experiments are so dilute that the average interatomic distance is much larger than the characteristic range of the atomic interaction, and so cold that the thermal de Broglie wave length is much larger than that range. Normally they are weakly interacting. By tuning them near a Feshbach resonance, near which the twobody scattering length can be made arbitrarily large, however, people can easily make them strongly interacting. When the scattering length is much larger than the range, we can consider an idealized model in which the range of the interaction is taken to be zero. Within such a model, the scattering length becomes the only parameter for the atomic interactions, if the atoms are fermionic and there are no more than two spin states involved. In such a model, the momentum distribution of the atoms behaves as C/k^4+O(1/k^6) when the wave number k goes to infinity. The coefficient C is known as the contact. There are some exact relations relating the energy, pressure, and the twobody shortrange correlation functions, etc. All of them involve the contact C. In particular, the energy of such a gas is a linear functional of the momentum distribution, for both the ground state and all excited states. This is true even if the scattering length is comparable to or larger than the average interatomic distance, such that the gas is strongly interacting.  Anna VershyninaTitle: Quantum analogues of geometric inequalities for Information Theory Abstract: Geometric inequalities, such as entropy power inequality or the isoperimetric inequality, relate geometric quantities, such as volumes and surface areas. Entropy power inequality describes how the entropy power of a sum of random variables behaves to the sum of entropy powers. The isoperimetric inequality for entropies relates the entropy power and the Fisher information, and implies that Gaussians have minimal entropy power among random variables with a fixed Fisher information. Classically, these inequalities have useful applications for obtaining bounds on channel capacities, and deriving LogSobolev inequalities. In my talk I provide quantum analogues of certain wellknown inequalities from classical information theory, with the most notable being the isoperimetric inequality for entropies. The latter inequality is useful for the study of convergence of certain semigroups to fixed points. In the talk I demonstrate how to apply the isoperimetric inequality for entropies to show exponentially fast convergence of quantum OrnsteinUhlenbeck (qOU) semigroup to a fixed point of the process. The inequality representing the fast convergence can be viewed as a quantum analogue of a classical LogSobolev inequality. As a separate result, necessary for the fast convergence of qOU semigroup, I argue that gaussian thermal states minimize output entropy for the attenuator semigroup among all states with a given meanphoton number. (based on a joint work with S. Huber and R. Koenig)  Vieri Mastropietro Title: Localization of Interacting Fermions in the AubryAndré Model Abstract: We establish exponential decay of the zero temperature correlations of a fermionic system with a quasiperiodic AubryAndré potential and a many body short range interaction, for weak hopping and interactions and almost everywhere in the frequency and phase. Such decay indicates localization of the ground state.The proof is based on rigorous Renormalization Group methods and it is inspired by techniques developed to deal with KAM Lindstedt series. New problems are posed by the simultaneous presence of loops and small divisors.  
5:30pm  Nicholas ReadTitle: Compactlysupported Wannier functions, algebraic Ktheory, and tensor network states Abstract:  Robert SeiringerTitle: Decay of correlations and absence of superfluidity in the disordered TonksGirardeau gas Abstract: We consider the TonksGirardeau gas subject to a random external potential. If the disorder is such that the underlying oneparticle Hamiltonian displays localization (which is known to be generically the case), we show that there is exponential decay of correlations in the manybody eigenstates. Moreover, there is no BoseEinstein condensation and no superfluidity, even at zero temperature. (Joint work with Simone Warzel.) 
Links
[1] http://qmath13.gatech.edu/print/45
[2] http://www.fis.puc.cl/~rbenguri/
[3] http://qmath13.gatech.edu/lecture
[4] http://www.gordonbiersch.com/restaurants