Symmetries of exotic aspherical space forms

Abstract

We study finite group actions on smooth manifolds of the form M\#, where is an exotic n-sphere and M is a closed aspherical space form. We give a classification result for free actions of finite groups on M\# when M is 7-dimensional. We show that if Z/p Z acts freely on Tn\#, then is divisible by p in the group of homotopy spheres. When M is hyperbolic, we give examples M\# that admit no nontrivial smooth action of a finite group, even though Isom(M) is arbitrarily large. Our proofs combine geometric and topological rigidity results with smoothing theory and computations with the Atiyah--Hirzebruch spectral sequence.