Every group is the group of self homotopy equivalences of finite dimensional CW-complex

Abstract

We prove that any group G occurs as (X), where X is CW-complex of finite dimension and (X) denotes its group of self-homotopy equivalence. Thus, we generalize a well know-theorem due to Costoya and Viruel CV asserting that any finite group occurs as (X), where X is rational elliptic space.

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