Certain maps preserving self-homotopy equivalences
Abstract
Let E(X) be the group of homotopy classes of self homotopy equivalences for a connected CW complex X. We observe two classes of maps E-maps and co-E-maps. They are defined as the maps X Y that induce the homomorphisms E(X) E( Y) and E(Y) E(X), respectively. We give some rationalized examples related to spheres, Lie groups and homogeneous spaces by using Sullivan models. Furthermore, we introduce an E-equivalence relation between rationalized spaces XQ and YQ as a geometric realization of an isomorphism E(XQ) E(YQ).
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