On the homotopy groups of the self equivalences of linear spheres

Abstract

Let S(V) be a complex linear sphere of a finite group G. %the space of unit vectors in a complex representation V of a finite group G. Let S(V)*n denote the n-fold join of S(V) with itself and let G(S(V)*) denote the space of G-equivariant self homotopy equivalences of S(V)*n. We show that for any k ≥ 1 there exists M>0 which depends only on V such that |πk G(S(V)*n)| ≤ M is for all n 0.