English

Sequential $n$-connectedness and infinite factorization in higher homotopy groups

Algebraic Topology 2021-03-26 v1

Abstract

A space XX is "sequentially nn-connected" at xXx\in X if for every 0kn0\leq k\leq n and sequence of maps f1,f2,f3,:SkXf_1,f_2,f_3,\dots:S^k\to X that converges toward a point xXx\in X, the maps fmf_m contract by a sequence of null-homotopies that converge toward xx. We use this property, in conjunction with the Whitney Covering Lemma, as a foundation for developing new methods for characterizing higher homotopy groups of finite dimensional Peano continua. Among many new computations, a culminating result of this paper is: if YY is a space obtained by attaching an infinite shrinking sequence A1,A2,A3,A_1,A_2,A_3,\dots of (n1)(n-1)-connected CW-complexes to a one-dimensional Peano continuum XX along a sequence of points in XX, then there is an injection Φ:πn(Y)j=1π1(X)πn(Aj)\Phi:\pi_n(Y)\to \prod_{j=1}^{\infty}\bigoplus_{\pi_1(X)}\pi_n(A_j) that is canonical after a certain choice of paths in XX is made. Moreover, we characterize the image of Φ\Phi using generalized covering space theory. As a case of particular interest, this provides a characterization of πn(H1Hn)\pi_n(\mathbb{H}_1\vee \mathbb{H}_n) where Hn\mathbb{H}_n denotes the nn-dimensional Hawaiian earring.

Keywords

Cite

@article{arxiv.2103.13456,
  title  = {Sequential $n$-connectedness and infinite factorization in higher homotopy groups},
  author = {Jeremy Brazas},
  journal= {arXiv preprint arXiv:2103.13456},
  year   = {2021}
}

Comments

73 pages, 14 figures

R2 v1 2026-06-24T00:31:56.979Z