The Lyapunov exponent as a signature of dissipative many-body quantum chaos

TL;DR

This paper defines dissipative quantum chaos using out-of-time-order correlators, computes the Lyapunov exponent analytically and numerically for a large q Sachdev-Ye-Kitaev model coupled to a bath, and shows chaos diminishes with increased coupling.

Contribution

It introduces a precise definition of dissipative quantum chaos via Lyapunov exponents and provides analytical and numerical results for a large q SYK model with environmental coupling.

Findings

Lyapunov exponent decreases with bath coupling

Chaos transitions to non-chaotic dynamics at a critical coupling

Positive Lyapunov exponent indicates dissipative quantum chaos

Abstract

A distinct feature of Hermitian quantum chaotic dynamics is the exponential increase of certain out-of-time-order-correlation (OTOC) functions around the Ehrenfest time with a rate given by a Lyapunov exponent. Physically, the OTOCs describe the growth of quantum uncertainty that crucially depends on the nature of the quantum motion. Here, we employ the OTOC in order to provide a precise definition of dissipative quantum chaos. For this purpose, we compute analytically the Lyapunov exponent for the vectorized formulation of the large $q$-limit of a $q$-body Sachdev-Ye-Kitaev model coupled to a Markovian bath. These analytic results are confirmed by an explicit numerical calculation of the Lyapunov exponent for several values of $q \geq 4$ based on the solutions of the Schwinger-Dyson and Bethe-Salpeter equations. We show that the Lyapunov exponent decreases monotonically as the coupling to the bath increases and eventually becomes negative at a critical value of the coupling signaling a transition to a dynamics which is no longer quantum chaotic. Therefore, a positive Lyapunov exponent is a defining feature of dissipative many-body quantum chaos. The observation of the breaking of the exponential growth for sufficiently strong coupling suggests that dissipative quantum chaos may require in certain cases a sufficiently weak coupling to the environment.