Mapping class groups of exotic tori and actions by SLd( Z)

Abstract

We determine for which exotic tori T of dimension d≠4 the homomorphism from the group of isotopy classes of orientation-preserving diffeomorphisms of T to SLd( Z) given by the action on the first homology group is split surjective. As part of the proof we compute the mapping class group of all exotic tori T that are obtained from the standard torus by a connected sum with an exotic sphere. Moreover, we show that any nontrivial SLd( Z)-action on T agrees on homology with the standard action, up to an automorphism of SLd( Z). When combined, these results in particular show that many exotic tori do not admit any nontrivial differentiable action by SLd( Z).