Integral cohomology of quotients via toric geometry

Abstract

We describe the integral cohomology of X/G where X is a compact complex manifold and G a cyclic group of prime order with only isolated fixed points. As a preliminary step, we investigate the integral cohomology of toric blow-ups of quotients of Cn. We also provide necessary and sufficient conditions for the spectral sequence of equivariant cohomology of (X,G) to degenerate at the second page. As an application, we compute the Beauville--Bogomolov form of X/G when X is a Hilbert scheme of points on a K3 surface and G a symplectic automorphism group of orders 5 or 7.