Finite group actions on manifolds without odd cohomology

Abstract

Let X be a compact smooth manifold, possibly with boundary. Denote by X1,…,Xr the connected components of X. Assume that the integral cohomology of X is torsion free and supported in even degrees. We prove that there exists a constant C such that any finite group G acting smoothly and effectively on X has an abelian subgroup A of index at most C, which can be generated by at most Σi[ Xi/2] elements, and which satisfies (XiA)=(Xi) for every i. This proves, for all such manifolds X, a conjecture of \'Etienne Ghys. An essential ingredient of the proof is a result on finite groups by Alexandre Turull and the author which uses the classification of finite simple groups.