Homotopy Inertia Groups and Tangential Structures

Abstract

We show that if M and N have the same homotopy type of simply connected closed smooth m-manifolds such that the integral and mod-2 cohomologies of M vanish in odd degrees, then their homotopy inertia groups are equal. Let M2n be a closed (n-1)-connected 2n-dimensional smooth manifold. We show that, for n=4, the homotopy inertia group of M2n is trivial and if n=8 and Hn(M2n;Z) Z, the homotopy inertia group of M2n is also trivial. We further compute the group C(M2n) of concordance classes of smoothings of M2n for n=8. Finally, we show that if a smooth manifold N is tangentially homotopy equivalent to M8, then N is diffeomorphic to the connected sum of M8 and a homotopy 8-sphere.