On the second stable homotopy group of the Eilenberg-Maclane space and the Schur Multiplier

Abstract

We prove that for a finitely generated group G, the second stable homotopy group π2S(K(G,1)) of the Eilenberg-Maclane space K(G,1) is completely determined by the Schur multiplier H2(G). We also prove that the second stable homotopy group π2S(K(G,1)) is equal to the Schur multiplier H2(G) for a torsion group G with no elements of order 2 and show that for such groups, π2S(K(G,1)) is a direct factor of π3(SK(G,1)), where S denotes suspension and π2S the second stable homotopy group. We compute π3(SK(G,1)) and π2S(K(G,1)) for symmetric, alternating, general linear groups over finite fields and some infinite general linear groups G. We also obtain a bound for the Schur multiplier of all finite groups G analogous to Green's bound for p-groups.