The fibre of the degree 3 map, Anick spaces and the double suspension

Abstract

Let S2n+1\p\ denote the homotopy fibre of the degree p self map of S2n+1. For primes p 5, work of Selick shows that S2n+1\p\ admits a nontrivial loop space decomposition if and only if n=1 or p. Indecomposability in all but these dimensions was obtained by showing that a nontrivial decomposition of S2n+1\p\ implies the existence of a p-primary Kervaire invariant one element of order p in π2n(p-1)-2S. We prove the converse of this last implication and observe that the homotopy decomposition problem for S2n+1\p\ is equivalent to the strong p-primary Kervaire invariant problem for all odd primes. For p=3, we use the 3-primary Kervaire invariant element θ3 to give a new decomposition of S55\3\ analogous to Selick's decomposition of S2p+1\p\ and as an application prove two new cases of a long-standing conjecture stating that the fibre of the double suspension S2n-1 2S2n+1 is homotopy equivalent to the double loop space of Anick's space.