We construct and solve a classical percolation model with a phase transition that we argue acts as a proxy for the quantum many-body localization transition. The classical model is defined on a graph in the Fock space of a disordered, interacting quantum spin chain, using a convenient choice of basis. Edges of the graph represent matrix elements of the spin Hamiltonian between pairs of basis states that are expected to hybridize strongly. At weak disorder, all nodes are connected, forming a single cluster. Many separate clusters appear above a critical disorder strength, each typically having a size that is exponentially large in the number of spins but a vanishing fraction of the Fock-space dimension. We formulate a transfer matrix approac...
Disorder-free localization is a novel mechanism for ergodicity breaking which can occur in interacti...
Abstract. The one-dimensional contact model for the spread of disease may be viewed as a directed pe...
Quantum percolation is one of several disorder-only models that address the question of whether cond...
We study classical percolation models in Fock space as proxies for the quantum many-body localizatio...
We consider network models for localisation problems belonging to symmetry class C. This symmetry cl...
We propose a new approach to probing ergodicity and its breakdown in one-dimensional quantum many-bo...
Quantum spin chains provide some of the mathematically most accessible examples of quantum many-body...
We study the transitions between ergodic and many-body localized phases in spin systems, subject to ...
We introduce an analytic approach to many-body localization (MBL) in random spin chains. We consider...
A canonical model for many-body localization (MBL) is studied, of interacting spinless fermions on a...
We study quantum percolation which is described by a tight-binding Hamiltonian containing only off-d...
We re-examine attempts to study the many-body localization transition using measures that are physic...
We study a quantum spin system—adapted from a facilitated spin model for classical glasses—with loca...
13 pages, 4 figuresWe study a quantum network percolation model which is numerically pertinent to th...
We consider the random-field Heisenberg model, a paradigmatic model for many-body localization (MBL)...
Disorder-free localization is a novel mechanism for ergodicity breaking which can occur in interacti...
Abstract. The one-dimensional contact model for the spread of disease may be viewed as a directed pe...
Quantum percolation is one of several disorder-only models that address the question of whether cond...
We study classical percolation models in Fock space as proxies for the quantum many-body localizatio...
We consider network models for localisation problems belonging to symmetry class C. This symmetry cl...
We propose a new approach to probing ergodicity and its breakdown in one-dimensional quantum many-bo...
Quantum spin chains provide some of the mathematically most accessible examples of quantum many-body...
We study the transitions between ergodic and many-body localized phases in spin systems, subject to ...
We introduce an analytic approach to many-body localization (MBL) in random spin chains. We consider...
A canonical model for many-body localization (MBL) is studied, of interacting spinless fermions on a...
We study quantum percolation which is described by a tight-binding Hamiltonian containing only off-d...
We re-examine attempts to study the many-body localization transition using measures that are physic...
We study a quantum spin system—adapted from a facilitated spin model for classical glasses—with loca...
13 pages, 4 figuresWe study a quantum network percolation model which is numerically pertinent to th...
We consider the random-field Heisenberg model, a paradigmatic model for many-body localization (MBL)...
Disorder-free localization is a novel mechanism for ergodicity breaking which can occur in interacti...
Abstract. The one-dimensional contact model for the spread of disease may be viewed as a directed pe...
Quantum percolation is one of several disorder-only models that address the question of whether cond...