Inertia groups and smooth structures of (n-1)-connected 2n-manifolds

Abstract

Let M2n denote a closed (n-1)-connected smoothable topological 2n-manifold. We show that the group C(M2n) of concordance classes of smoothings of M2n is isomorphic to the group of smooth homotopy spheres 2n for n=4 or 5, the concordance inertia group Ic(M2n)=0 for n=3, 4, 5 or 11 and the homotopy inertia group Ih(M2n)=0 for n=4. On the way, following Wall's approach Wal67 we present a new proof of the main result in KS07, namely, for n=4, 8 and Hn(M2n;Z) Z, the inertia group I(M2n) Z2. We also show that, up to orientation-preserving diffeomorphism, M8 has at most two distinct smooth structures; M10 has exactly six distinct smooth structures and then show that if M14 is a π-manifold, M14 has exactly two distinct smooth structures.