The triviality of the 61-stem in the stable homotopy groups of spheres

Abstract

We prove that the 2-primary π61 is zero. As a consequence, the Kervaire invariant element θ5 is contained in the strictly defined 4-fold Toda bracket 2, θ4, θ4, 2. Our result has a geometric corollary: the 61-sphere has a unique smooth structure and it is the last odd dimensional case - the only ones are S1, S3, S5 and S61. Our proof is a computation of homotopy groups of spheres. A major part of this paper is to prove an Adams differential d3(D3) = B3. We prove this differential by introducing a new technique based on the algebraic and geometric Kahn-Priddy theorems. The success of this technique suggests a theoretical way to prove Adams differentials in the sphere spectrum inductively by use of differentials in truncated projective spectra.