Trace formulas for Wiener--Hopf operators with applications to entropies of free fermionic equilibrium states

Abstract

We consider non-smooth functions of (truncated) Wiener--Hopf type operators on the Hilbert space L2( Rd). Our main results are uniform estimates for trace norms (d 1) and quasiclassical asymptotic formulas for traces of the resulting operators (d=1). Here, we follow Harold Widom's seminal ideas, who proved such formulas for smooth functions decades ago. The extension to non-smooth functions and the uniformity of the estimates in various (physical) parameters rest on recent advances by one of the authors (AVS). We use our results to obtain the large-scale behaviour of the local entropy and the spatially bipartite entanglement entropy (EE) of thermal equilibrium states of non-interacting fermions in position space Rd (d 1) at positive temperature, T>0. In particular, our definition of the thermal EE leads to estimates that are simultaneously sharp for small T and large scaling parameter α>0 provided that the product Tα remains bounded from below. Here α is the reciprocal quasiclassical parameter. For d=1 we obtain for the thermal EE an asymptotic formula which is consistent with the large-scale behaviour of the ground-state EE (at T=0), previously established by the authors for d 1.