Homological Nielsen realization for the manifolds \#n CP2

Abstract

Given a smooth, oriented, simply-connected 4-manifold M, the homological Nielsen realization problem asks: when does a finite group of isometries G≤ O(H2(M;Z)) preserving the intersection form lift isomorphically to a finite group of orientation-preserving diffeomorphisms? We study this question for the smooth, positive-definite 4-manifolds Mn:=\#nCP2. Even though every isometry of H2(Mn;Z) is induced by some orientation-preserving diffeomorphism, not necessarily of finite order, we show that Nielsen realization is sparse: as n∞, a random subgroup of O(H2(Mn;Z)) is asymptotically almost never realizable in Diff+(Mn); the same is true for random odd order elements of O(H2(Mn;Z)). We present both positive realization results in certain cases and a range of obstructions to realization in other cases. The proofs combine equivariant connected-sum constructions, fixed-point theory for group actions on 4-manifolds, finite group actions on surfaces, analytic combinatorics, and previous work of Hambleton--Tanase.