Infinite families of very exotic spheres with free S1- and S3-actions

Abstract

There are two kinds of exotic spheres: bp spheres, which bound parallelizable manifolds, and non-bp spheres, or very exotic spheres, which do not. In the 1960s, W.-C. Hsiang showed that in each dimension where bp spheres exist, there is at least one which admits infinitely many inequivalent smooth free S1-actions, and in each dimension congruent to 3 modulo 4, there is at least one bp sphere which admits infinitely many inequivalent smooth free S3-actions. On the other hand, for each fixed prime p, smooth free S1- and S3-actions have only been recorded to exist for finitely many very exotic spheres with nontrivial p-local Kervaire--Milnor invariant, all in dimension less than approximately p3. In this paper, we use topological modular forms to detect smooth free S1- and S3-actions on infinite families of very exotic spheres with nontrivial 2- and 3-local Kervaire--Milnor invariants.