Stabilization of the homotopy groups of the self equivalences of linear spheres

Abstract

Let G be a finite group. Let U1,U2,… be a sequence of orthogonal representations in which any irreducible representation of n ≥ 1 Un has infinite multiplicity. Let Vn=i=1n Un and S(Vn) denote the linear sphere of unit vectors. Then for any i ≥ 0 the sequence of group … → πi mapG(S(Vn),S(Vn)) → πi mapG(S(Vn+1),S(Vn+1)) → … stabilizes with the stable group H ωi(BWGH) where H runs through representatives of the conjugacy classes of all the isotropy group of the points of S(n Un).