Condensed Matter Theory

Integrability of one-dimensional Lindbladians from operator-space fragmentation

Physical Review E American Physical Society 102:6 (2020) 062210

Authors:

Fabian HL Essler, Lorenzo Piroli

Abstract:

We introduce families of one-dimensional Lindblad equations describing open many-particle quantum systems that are exactly solvable in the following sense: (i) The space of operators splits into exponentially many (in system size) subspaces that are left invariant under the dissipative evolution; (ii) the time evolution of the density matrix on each invariant subspace is described by an integrable Hamiltonian. The prototypical example is the quantum version of the asymmetric simple exclusion process (ASEP) which we analyze in some detail. We show that in each invariant subspace the dynamics is described in terms of an integrable spin-1/2 XXZ Heisenberg chain with either open or twisted boundary conditions. We further demonstrate that Lindbladians featuring integrable operator-space fragmentation can be found in spin chains with arbitrary local physical dimensions.

Josephson oscillations in split one-dimensional Bose gases

(2020)

Authors:

Yuri D van Nieuwkerk, Jörg Schmiedmayer, Fabian HL Essler

Robustness and Stability of Spin Glass Ground States to Perturbed Interactions

(2020)

Authors:

Vaibhav Mohanty, Ard A Louis

Theory of competing excitonic orders in insulating WTe$_2$ monolayers

(2020)

Authors:

Yves H Kwan, T Devakul, SL Sondhi, SA Parameswaran

A systematic 1/c-expansion of form factor sums for dynamical correlations in the Lieb-Liniger model

SciPost Physics SciPost 9:6 (2020) 82

Authors:

Fabian HL Essler, Etienne Granet

Abstract:

We introduce a framework for calculating dynamical correlations in the Lieb-Liniger model in arbitrary energy eigenstates and for all space and time, that combines a Lehmann representation with a 1/c expansion. The nth term of the expansion is of order 1/cn and takes into account all [n/2] + 1 particle-hole excitations over the averaging eigenstate. Importantly, in contrast to a "bare" 1/c expansion it is uniform in space and time. The framework is based on a method for taking the thermodynamic limit of sums of form factors that exhibit non integrable singularities. We expect our framework to be applicable to any local operator. We determine the first three terms of this expansion and obtain an explicit expression for the density-density dynamical correlations and the dynamical structure factor at order 1/c2. We apply these to finite-temperature equilibrium states and non-equilibrium steady states after quantum quenches. We recover predictions of (nonlinear) Luttinger liquid theory and generalized hydrodynamics in the appropriate limits, and are able to compute sub-leading corrections to these.