Krylov space perturbation theory for quantum synchronization in closed systems

TL;DR

This paper investigates quantum synchronization in a closed disordered Heisenberg spin chain, revealing how disorder induces spatial synchronization and affects dynamical symmetries through Krylov space perturbation analysis.

Contribution

It introduces a Krylov space perturbation framework to understand synchronization and symmetry breaking in closed quantum many-body systems with disorder.

Findings

Spatial synchronization emerges with large disorder.

Weak disorder causes second-order frequency corrections.

Strong disorder leads to finite lifetime of dynamical symmetries.

Abstract

Strongly interacting quantum many-body systems are expected to thermalize, however, some evade thermalization due to symmetries. Quantum synchronization provides one such example of ergodicity breaking, but previous studies have focused on open systems. Here, motivated by the problem of ergodicity breaking in closed systems and the study of non-trivial dynamics, we investigate synchronization in a closed disordered Heisenberg spin chain. In the presence of large random disorder, strongly breaking the permutation symmetry of the system, we observe the emergence of spatial synchronization, where spins lock into locally synchronized patches. This behavior can be interpreted as a fragmentation of the global dynamical symmetry $S^+$ into a collection of local dynamical symmetries, each characterized by a distinct frequency. In the weak-disorder regime, still without permutation symmetry, we show that the synchronization mechanism can be understood perturbatively within Krylov space. In the absence of disorder, the Krylov space associated with the dynamical symmetry $S^+$ is two-dimensional. Introducing disorder couples this subspace to the remainder of the Krylov space. This coupling leads only to a second-order correction to the frequency of the dynamical symmetry, thereby preserving coherent oscillations despite the presence of small disorder. At stronger disorder, the perturbation modifies $S^+$ so that it acquires a finite lifetime, providing an example of a transient dynamical symmetry.