Free actions of finite groups on products of Dold manifolds

Abstract

The Dold manifold P(m,n) is the quotient of Sm × CPn by the free involution that acts antipodally on Sm and by complex conjugation on CPn . In this paper, we investigate free actions of finite groups on products of Dold manifolds. We show that if a finite group G acts freely and mod 2 cohomologically trivially on a finite-dimensional CW-complex homotopy equivalent to Πi=1k P(2mi,ni), then G (Z2)l for some l≤ k. This is achieved by first proving a similar assertion for Πi=1k S2mi × C Pni . We also determine the possible mod 2 cohomology algebra of orbit spaces of arbitrary free involutions on Dold manifolds, and give an application to Z2 -equivariant maps.