Rigidity of self-maps of Vn,2 and manifolds tangentially homotopy equivalent to Vn,2 × Sk

Abstract

We study two problems concerning the Stiefel manifolds Vn,2 and their products with spheres. First, we address a rigidity problem: we determine, for most values of~n, all self-maps of Vn,2 that are homotopic to an almost diffeomorphism. Second, we classify smooth closed manifolds tangentially homotopy equivalent to Vn,2 × Sk up to almost diffeomorphism, for k = 3, 5 or 7 ≤ k, k ≠ 2i - 2 \ and \ Dim(Vn,2 × Sk) ≠ 2i - 2. Our method is to find explicit inverses in the structure set via normal invariants of specific tangential homotopy equivalences. In favourable cases -- notably V12,2 × S3, V16,2 × S3, V10,2 × S5 -- the classification is complete: every such manifold is almost diffeomorphic to Vn,2 \# Σ× Sk for some exotic sphere Σ. In the general case, we identify inverses for a large subgroup of Im(η) and provide a reasonable direction for the remainder.