Certain number on the groups of self homotopy equivalences

Abstract

For a connected based space X, let [X,X] be the set of all based homotopy classes of base point preserving self map of X and let (X) be the group of self-homotopy equivalences of X. We denote by k(X) the set of homotopy classes of self-maps of X that induce an automorphism of πi(X) for i=0,1,·s,k. That is, [f]∈ k(X) if and only if πi(f):πi(X)πi(X) is an isomorphism for i=0,1,·s ,k. Then, (X)⊂eqk(X)⊂eq [X,X] for a nonnegative integer k. Moreover, for a connected CW-complex X, we have (X)=(X). In this paper, we study the properties of k(X) and discuss the conditions under which (X)=k(X) and the minimum value of such k. Furthermore, we determine the value of k for various spaces, including spheres, products of spaces, and Moore spaces.