A trace formula for foliated flows

Abstract

Let F be a transversely oriented foliation of codimension 1 on a closed manifold M, and let φ=\φt\ be a foliated flow on (M,F). Assume the closed orbits of φ are simple and its preserved leaves are transversely simple. In this case, there are finitely many preserved leaves, which are compact. Let M0 denote their union, M1=M M0 and F1=F|M1. We consider two topological vector spaces, I(F) and I'(F), consisting of the leafwise currents on M that are conormal and dual-conormal to M0, respectively. They become topological complexes with the differential operator dF induced by the de~Rham derivative on the leaves, and they have an R-action φ*=\φt\,*\ induced by φ. Let H I(F) and H I'(F) denote the corresponding leafwise reduced cohomologies, with the induced R-action φ*=\φt\,*\. We define some kind of Lefschetz distribution L dis(φ) of the actions φ* on both H I(F) and H I'(F), whose value is a distribution on R. Its definition involves several renormalization procedures, the main one being the b-trace of some smoothing b-pseudodifferential operator on the compact manifold with boundary obtained by cutting M along M0. We also prove a trace formula describing L dis(φ) in terms of infinitesimal data from the closed orbits and preserved leaves. This solves a conjecture of C.~Deninger involving two leafwise reduced cohomologies instead of a single one.