Almost fixed points of finite group actions on manifolds without odd cohomology

Abstract

If X is a smooth manifold and G is a subgroup of Diff(X) we say that (X,G) has the almost fixed point property if there exists a number C such that for any finite subgroup G≤G there is some x∈ X whose stabilizer Gx≤ G satisfies [G:Gx]≤ C. We say that X has no odd cohomology if its integral cohomology is torsion free and supported in even degrees. We prove that if X is compact and possibly with boundary and has no odd cohomology then (X,Diff(X)) has the almost fixed point property. Combining this with a result of Petrie and Randall we conclude that if Z is a non necessarily compact smooth real affine variety, and Z has no odd cohomology, then (Z,Aut(Z)) has the almost fixed point property, where Aut(Z) is the group of algebraic automorphisms of Z lifting the identity on Spec\,R.