Projective modules and the homotopy classification of (G,n)-complexes

Abstract

A (G,n)-complex is an n-dimensional CW-complex with fundamental group G and whose universal cover is (n-1)-connected. If G has periodic cohomology then, for appropriate n, we show that there is a one-to-one correspondence between the homotopy types of finite (G,n)-complexes and the orbits of the stable class of a certain projective Z G-module under the action of Aut(G). We develop techniques to compute this action explicitly and use this to give an example where the action is non-trivial.