Characterizations of G-ANR spaces and inverse limits
Abstract
In this paper we prove that, for a compact group G, a metrizable G-space is a G-ANR under the following asumptions: (1) if it dominates a G-ANR space through a fine G-homotopy equivalence; (2) if it is G-homotopy dense in a G-ANR; (3) if it contains a G-ANR as a G-homotopy dense subset; (4) if it is the inverse limit of an inverse sequence of G-ANR spaces with bonding maps that are fine G-homotopy equivalences.
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