On the group of self-homotopy equivalences of a 2-connected and 6-dimensional CW-complex
Abstract
Let X be a 2-connected and 6-dimensional CW-complex X such that H3(X)2=0. This paper aims to describe the group (X) of the self-homotopy equivalences of X modulo its normal subgroup *(X) of the elements that induce the identity on the homology groups. Making use of the Whitehead exact sequence of X, denoted by WES(X), we define the group (X) of -automorphisms of WES(X) and we prove that (X)/*(X) (X).
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