Out-of-Time Ordered Correlator for a Chaotic Many-Body Quantum System
Abstract
Using the parametric representation of a chaotic many-body quantum system derived earlier, we calculate explicitly the large-time dependence and asymptotic value of the out-of-time correlator (OTOC) of that system. The dependence on time t is determined by t / . Here is the energy correlation width within which the Bohigas-Giannoni-Schmit conjecture applies. We conjecture that is universally related to the leading Ljapunov coefficient of the corresponding classical system by = λ. Then the large-time behavior of OTOC is given by the dimensionless parameter λ t.
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