Geometric approach to stable homotopy groups of spheres II. The Kervaire invariant

Abstract

A solution to the Kervaire invariant problem is presented. We introduce the concepts of abelian structure on skew-framed immersions, bicyclic structure on /2[3]--framed immersions, and quaternionic-cyclic structure on /2[4]--framed immersions. Using these concepts, we prove that for sufficiently large n, n=2-2, an arbitrary skew-framed immersion in Euclidean n-space n has zero Kervaire invariant. Additionally, for 12 (i.e., for n 4094) an arbitrary skew-framed immersion in Euclidean n-space n has zero Kervaire invariant if this skew-framed immersion admits a compression of order 16.