Litcius/Paper detail

On systems of maximal quantum chaos

Mike Blake, Hong Liu

2021Journal of High Energy Physics48 citationsDOIOpen Access PDF

Abstract

A bstract A remarkable feature of chaos in many-body quantum systems is the existence of a bound on the quantum Lyapunov exponent. An important question is to understand what is special about maximally chaotic systems which saturate this bound. Here we provide further evidence for the ‘hydrodynamic’ origin of chaos in such systems, and discuss hallmarks of maximally chaotic systems. We first provide evidence that a hydrodynamic effective field theory of chaos we previously proposed should be understood as a theory of maximally chaotic systems. We then emphasize and make explicit a signature of maximal chaos which was only implicit in prior literature, namely the suppression of exponential growth in commutator squares of generic few-body operators. We provide a general argument for this suppression within our chaos effective field theory, and illustrate it using SYK models and holographic systems. We speculate that this suppression indicates that the nature of operator scrambling in maximally chaotic systems is fundamentally different to scrambling in non-maximally chaotic systems. We also discuss a simplest scenario for the existence of a maximally chaotic regime at sufficiently large distances even for non-maximally chaotic systems.

Topics & Concepts

PhysicsQuantumCHAOS (operating system)Quantum chaosQuantum mechanicsTheoretical physicsStatistical physicsQuantum dynamicsComputer securityComputer scienceQuantum many-body systemsQuantum chaos and dynamical systemsTheoretical and Computational Physics