Det-Det Correlations for Quantum Maps: Dual Pair and Saddle-Point Analyses

TL;DR

This paper analyzes the spectral determinant correlations of quantum maps using dual pair and saddle-point methods, revealing exact results at leading order and exploring ensemble averaging effects relevant to quantum chaos.

Contribution

It introduces a novel dual pair decomposition and saddle-point analysis for spectral determinants of quantum maps, connecting to the Weyl character formula and ensemble crossover.

Findings

Leading-order saddle-point reproduces spectral correlator exactly

Semiclassical averaging scheme yields vanishing loop corrections

Crossover between Poisson and CUE ensembles is characterized

Abstract

An attempt is made to clarify the ballistic non-linear sigma model formalism recently proposed for quantum chaotic systems, by the spectral determinant Z(s)=Det(1-sU) of a quantized map U element of U(N). More precisely, we study the correlator omega_U(s)=<|Z(st)|^2> (averaging t over the unit circle). Identifying the group U(N) as one member of a dual pair acting in the spinor representation of Spin(4N), omega_U(s) is expanded in terms of irreducible characters of U(N). In close analogy with the ballistic non-linear sigma model, a coherent-state integral representation of omega_U(s) is developed. We show that the leading-order saddle-point approximation reproduces omega_U(s) exactly, up to a constant factor; this miracle can be explained by interpreting omega_U(s) as a character of U(2N), for which the saddle-point expansion yields the Weyl character formula. Unfortunately, this decomposition behaves non-smoothly in the semiclassical limit, and to make further progress some averaging over U needs to be introduced. Several averaging schemes are investigated. In general, a direct application of the saddle-point approximation to these schemes is demonstrated to give incorrect results; this is not the case for a `semiclassical averaging scheme', for which all loop corrections vanish identically. As a side product of the dual pair decomposition, we compute a crossover between the Poisson and CUE ensembles for omega_U(s).