Random Matrix Elements and Eigenfunctions in Chaotic Systems
Abstract
The expected root-mean-square value of a matrix element Aαβ in a classically chaotic system, where A is a smooth, -independent function of the coordinates and momenta, and α and β label different energy eigenstates, has been evaluated in the literature in two different ways: by treating the energy eigenfunctions as gaussian random variables and averaging |Aαβ|2 over them; and by relating |Aαβ|2 to the classical time-correlation function of A. We show that these two methods give the same answer only if Berry's formula for the spatial correlations in the energy eigenfunctions (which is based on a microcanonical density in phase space) is modified at large separations in a manner which we previously proposed.
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