Add to ORKGWe present a quantum system composed of infinitely many particles, subject to a nonquadratic Hamiltonian, for which it is possible to investigate the long time behavior of the dynamics and its ergodic properties. We do so both for the KMS states and for a large class of locally normal invariant states, whose very existence is already of some interest
We solve a minimal model for an ergodic phase in a spatially extended quantum many-body system. The ...
We study a class of quantum Markov processes that, on the one hand, is inspired by the micromaser ex...
International audienceThe Nosé–Hoover dynamics is a deterministic method that is commonly used to sa...
We present a quantum system composed of infinitely many particles, subject to a nonquadratic Hamilto...
We study the so-called Nonconventional Ergodic Theorem for noncommutative generic measures introduce...
Abstract. Quantum ergodicity theorem states that for quantum systems with er-godic classical flows, ...
We present a replica path integral approach describing the quantum chaotic dynamics of the SYK model...
We consider the dissipative properties of large quantum systems from the point of view of kinetic th...
We show that the orginal definition of ergodicity of Boltzmann can be directly applied to finite qua...
We show that the orginal definition of ergodicity of Boltzmann can be directly applied to finite qua...
For a large class of quantized ergodic flows the quantum ergodicity theorem due to Shnirelman, Zeldi...
: The rate of quantum ergodicity is studied for three strongly chaotic (Anosov) systems. The quanta...
Quantum Ergodicity aims at understanding the eigenstates of quantum mechanical systems admitting cha...
We study quantum Hamiltonians with potentials defined by strictly ergodic dynamical systems. Our int...
We solve a minimal model for an ergodic phase in a spatially extended quantum many-body system. The ...
We solve a minimal model for an ergodic phase in a spatially extended quantum many-body system. The ...
We study a class of quantum Markov processes that, on the one hand, is inspired by the micromaser ex...
International audienceThe Nosé–Hoover dynamics is a deterministic method that is commonly used to sa...
We present a quantum system composed of infinitely many particles, subject to a nonquadratic Hamilto...
We study the so-called Nonconventional Ergodic Theorem for noncommutative generic measures introduce...
Abstract. Quantum ergodicity theorem states that for quantum systems with er-godic classical flows, ...
We present a replica path integral approach describing the quantum chaotic dynamics of the SYK model...
We consider the dissipative properties of large quantum systems from the point of view of kinetic th...
We show that the orginal definition of ergodicity of Boltzmann can be directly applied to finite qua...
We show that the orginal definition of ergodicity of Boltzmann can be directly applied to finite qua...
For a large class of quantized ergodic flows the quantum ergodicity theorem due to Shnirelman, Zeldi...
: The rate of quantum ergodicity is studied for three strongly chaotic (Anosov) systems. The quanta...
Quantum Ergodicity aims at understanding the eigenstates of quantum mechanical systems admitting cha...
We study quantum Hamiltonians with potentials defined by strictly ergodic dynamical systems. Our int...
We solve a minimal model for an ergodic phase in a spatially extended quantum many-body system. The ...
We solve a minimal model for an ergodic phase in a spatially extended quantum many-body system. The ...
We study a class of quantum Markov processes that, on the one hand, is inspired by the micromaser ex...
International audienceThe Nosé–Hoover dynamics is a deterministic method that is commonly used to sa...