Bockstein basis and resolution theorems in extension theory

Abstract

We prove a generalization of the Edwards-Walsh Resolution Theorem: Theorem: Let G be an abelian group for which PG equals the set of all primes P, where PG=\p ∈ P: (p)∈ Bockstein Basis σ(G)\. Let n in N and let K be a connected CW-complex with πn(K) G, πk(K) 0 for 0≤ k< n. Then for every compact metrizable space X with Xτ K (i.e., with K an absolute extensor for X), there exists a compact metrizable space Z and a surjective map π: Z X such that (a) π is cell-like, (b) Z ≤ n, and (c) Zτ K.