Free actions of finite groups on products of Dold manifolds (1809.02307v4)

Abstract: The Dold manifold $ P(m,n)$ is the quotient of $S^m \times \mathbb{C}P^n$ by the free involution that acts antipodally on $ S^m $ and by complex conjugation on $ \mathbb{C}P^n $. 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 ${\displaystyle \prod_{i=1}^{k} P(2m_i,n_i)}$, then $G\cong (\mathbb{Z}2)^l$ for some $l\leq k$. This is achieved by first proving a similar assertion for $ \displaystyle \prod{i=1}^{k} S^{2m_i} \times \mathbb{C} P^{n_i} $. We also determine the possible mod 2 cohomology algebra of orbit spaces of arbitrary free involutions on Dold manifolds, and give an application to $ \mathbb{Z}_2 $-equivariant maps.