On the size of the space spanned by a nonequilibrium state in a quantum spin lattice system

Abstract

We consider the time evolution of a state in an isolated quantum spin lattice system with energy cumulants proportional to the number of the sites Ld. We compute the distribution of the eigenvalues of the time averaged state over a time window [t0,t0+t] in the limit of large L. This allows us to infer the size of a subspace that captures time evolution in [t0,t0+t] with an accuracy 1-ε. We estimate the size to be 2e2πerf-1(1-ε) Ld2t, where e2 is the energy variance per site, and erf-1 is the inverse error function.