A homotopy decomposition of the fibre of the squaring map on 3S17

Abstract

We use Richter's 2-primary proof of Gray's conjecture to give a homotopy decomposition of the fibre 3S17\2\ of the H-space squaring map on the triple loop space of the 17-sphere. This induces a splitting of the mod-2 homotopy groups π(S17; Z/2Z) in terms of the integral homotopy groups of the fibre of the double suspension E2:S2n-1 2S2n+1 and refines a result of Cohen and Selick, who gave similar decompositions for S5 and S9. We relate these decompositions to various Whitehead products in the homotopy groups of mod-2 Moore spaces and Stiefel manifolds to show that the Whitehead square [i2n, i2n] of the inclusion of the bottom cell of the Moore space P2n+1(2) is divisible by 2 if and only if 2n=2, 4, 8 or 16.