Inertia groups of (n-1)-connected 2n-manifolds

Abstract

In this paper, we compute the inertia groups of (n-1)-connected, smooth, closed, oriented 2n-manifolds where n ≥ 3. As a consequence, we complete the diffeomorphism classification of such manifolds, finishing a program initiated by Wall sixty years ago, with the exception of the 126-dimensional case of the Kervaire invariant one problem. In particular, we find that the inertia group always vanishes for n ≠ 4,8,9 -- for n 0, this was known by the work of several previous authors, including Wall, Stolz, and Burklund and Hahn with the first named author. When n = 4,8,9, we apply Kreck's modified surgery and a special case of Crowley's Q-form conjecture, proven by Nagy, to compute the inertia groups of these manifolds. In the cases n=4,8, our results recover unpublished work of Crowley--Nagy and Crowley--Olbermann. In contrast, we show that the homotopy and concordance inertia groups of (n-1)-connected, smooth, closed, oriented 2n-manifolds with n ≥ 3 always vanish.

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