Index theorems for couples of holomorphic self-maps

Abstract

Let M be a n-dimensional complex manifold and f,g:M M two distinct holomorphic self-maps. Suppose that f and g coincide on a globally irreducible compact hypersurface S⊂ M. We show that if one of the two maps is a local biholomorphism around S'=S-Sing(S) and, if needed, S' sits into M in a particular nice way, then it is possible to define a 1-dimensional holomorphic (possibly singular) foliation on S' and partial holomorphic connections on certain holomorphic vector bundles on S'. As a consequence, we are able to localize suitable characteristic classes and thus to get index theorems.