Which finite groups act smoothly on a given 4-manifold?

Abstract

We prove that for any closed smooth 4-manifold X there exists a constant C with the property that each finite subgroup G<Diff(X) has a subgroup N which is abelian or nilpotent of class 2, and which satisfies [G:N]≤ C. We give sufficient conditions on X for Diff(X) to be Jordan, meaning that there exists a constant C such that any finite subgroup G<Diff(X) has an abelian subgroup A satisfying [G:A]≤ C. Some of these conditions are homotopical, such as having nonzero Euler characteristic or nonzero signature, others are geometric, such as the absence of embedded tori of arbitrarily large self-intersection arising as fixed point components of periodic diffeomorphisms. Relying on these results, we prove that: (1) the symplectomorphism group of any closed symplectic 4-manifold is Jordan, and (2) the automorphism group of any almost complex closed 4-manifold is Jordan.