English

Fine shape II: A Whitehead-type theorem

Algebraic Topology 2022-11-22 v1 Group Theory Geometric Topology

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 π0\pi_0 and π1\pi_1 is a fine shape equivalence if and only if it induces isomorphisms on the πi\pi_i (=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 XX, the Steenrod-Sitnikov homology Hn(X)=0H_n(X)=0 if and only if each compactum KXK\subset X lies in a compactum LXL\subset X such that the map Hn(K)Hn(L)H_n(K)\to H_n(L) is trivial. A cornerstone result of the paper is purely algebraic: If a direct sequence of groups Γ0Γ1\Gamma_0\to\Gamma_1\to\dots has trivial colimit, then it is trivial as an ind-group (i.e. each Γi\Gamma_i maps trivially to some Γj\Gamma_j), as long as it has one of the following forms: \bullet limi1Gi0limi1Gi1\lim^1_i G_{i0}\to\lim^1_i G_{i1}\to\dots, where the GijG_{ij} are countable abelian groups; \bullet limiGi0limiGi1\lim_i G_{i0}\to\lim_i G_{i1}\to\dots, where the GijG_{ij} are finitely generated groups, which are either all abelian or satisfy the Mittag-Leffler condition for each jj.

Keywords

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

R2 v1 2026-06-28T06:19:34.234Z