On the Chern numbers for pseudo-free circle actions

Abstract

Let (M,) be a (2n+1)-dimensional oriented closed manifold equipped with a pseudo-free S1-action : S1 × M → M. We first define a local data L(M,) of the action which consists of pairs (C, (p(C) ; q(C))) where C is an exceptional orbit, p(C) is the order of isotropy subgroup of C, and q(C) ∈ (Zp(C)×)n is a vector whose entries are the weights of the slice representation of C. In this paper, we give an explicit formula of the Chern number c1(E)n, [M/S1] modulo Z in terms of the local data, where E = M ×S1 C is the associated complex line orbibundle over M/S1. Also, we illustrate several applications to various problems arising in equivariant symplectic topology.