Full Szego-type trace asymptotics for ergodic operators on large boxes

Abstract

We prove full Szego-type large-box trace asymptotics for selfadjoint Zd-ergodic operators ω Hω acting on L2(Rd). More precisely, let g be a bounded, compactly supported and real-valued function such that the (averaged) operator kernel of g(Hω) decays sufficiently fast, and let h be a sufficiently smooth compactly supported function. We then prove a full asymptotic expansion of the averaged trace of the operator h(g(Hω)[-L,L]d) in terms of the length-scale L.