Adams-Hilton model and the group of self-homotopy equivalences of a simply connected cw-complex

Abstract

Let R be a principal ideal domain (PID). For a simply connected CW-complex X of dimension n, let Y be a space obtained by attaching cells of dimension q to X, q>n, and let A(Y) denote an Adams-Hilton model of Y. If E(A(Y)) denotes the group of homotopy self-equivalences of A(Y) and E*(A(Y)) its subgroup of the elements inducing the identity on H*( Y,R), then we construct two short exact sequences: i\,Hq( X,R)→tail E(A(Y)) qn\,\,\,\,\,\,\,\,\,\,\,\,,\,\,\,\,\,\,\,\,\,\,\,\,i\,Hq( X,R) →tail *(A(Y)) qn where i=rank \,Hq(Y,X;R), qn is a subgroup of (Hom(Hq( Y,X;R))× (A(X)) and qn is a subgroup of E*(A(X)).