Universal acyclic resolutions for finitely generated coefficient groups

Abstract

We prove that for every compactum X and every integer n ≥ 2 there are a compactum Z of ≤ n and a surjective UVn-1-map r: Z X having the property that: for every finitely generated abelian group G and every integer k ≥ 2 such that G X ≤ k ≤ n we have G Z ≤ k and r is G-acyclic, or equivalently: for every simply connected CW-complex K with finitely generated homotopy groups such that X ≤ K we have Z ≤ K and r is K-acyclic. (A space is K-acyclic if every map from the space to K is null-homotopic. A map is K-acyclic if every fiber is K-acyclic.)

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