Finite-time Lyapunov fluctuations and the upper bound of classical and quantum out-of-time-ordered expansion rate exponents

Abstract

This Letter demonstrates for chaotic maps (logistic, classical and quantum standard maps (SMs)) that the exponential growth rate () of the out-of-time-ordered four-point correlator (OTOC) is equal to the classical Lyapunov exponent (λ) plus fluctuations ( (fluc)) of the one-step finite-time Lyapunov exponents (FTLEs). Jensen's inequality provides the upper bound λ for the considered systems. Equality is restored with = λ + (fluc), where (fluc) is quantified by k-higher-order cumulants of the FTLEs. Exact expressions for are derived and numerical results using k = 20 furnish (fluc) (2) for all maps (large kicking intensities in the SMs).