Finite group actions on 4-manifolds with nonzero Euler characteristic

Abstract

We prove that if X is a compact, oriented, connected 4-dimensional smooth manifold, possibly with boundary, satisfying (X)≠ 0, then there exists an integer C≥ 1 such that any finite group G acting smoothly and effectively on X has an abelian subgroup A satisfying [G:A]≤ C, (XA)=(X), and A can be generated by at most 2 elements. Furthermore, if (X)<0 then A is cyclic. This proves, for any such X, a conjecture of Ghys. We also prove an analogous result for manifolds of arbitrary dimension and non-vanishing Euler characteristic, but restricted to pseudofree actions.