Fine shape II: A Whitehead-type theorem
Abstract
We prove an "abelian, locally compact" Whitehead theorem in fine shape: A fine shape morphism between locally connected finite-dimensional locally compact separable metrizable spaces with trivial and is a fine shape equivalence if and only if it induces isomorphisms on the (=the Steenrod-Sitnikov homotopy groups). We show by an example that the hypothesis of local connectedness cannot be dropped (even though it can be dropped in the compact case). As a byproduct, we also show that for a locally compact separable metrizable space , the Steenrod-Sitnikov homology if and only if each compactum lies in a compactum such that the map is trivial. A cornerstone result of the paper is purely algebraic: If a direct sequence of groups has trivial colimit, then it is trivial as an ind-group (i.e. each maps trivially to some ), as long as it has one of the following forms: , where the are countable abelian groups; , where the are finitely generated groups, which are either all abelian or satisfy the Mittag-Leffler condition for each .
Cite
@article{arxiv.2211.11102,
title = {Fine shape II: A Whitehead-type theorem},
author = {Sergey A. Melikhov},
journal= {arXiv preprint arXiv:2211.11102},
year = {2022}
}
Comments
33 pages, 1 figure. "Fine shape I" is arXiv:1808.10228