English

Embedding Irregular Colorings into Connected Factorizations

Combinatorics 2022-09-15 v1 Discrete Mathematics

Abstract

For r:=(r1,,rk)r:=(r_1,\dots,r_k), an rr-factorization of the complete λ\lambda-fold hh-uniform nn-vertex hypergraph λKnh\lambda K_n^h is a partition of (the edges of) λKnh\lambda K_n^h into F1,,FkF_1,\dots, F_k such that for i=1,,ki=1,\dots,k, FiF_i is rir_i-regular and spanning. Suppose that n(h1)(2m1)n \geq (h-1)(2m-1). Given a partial rr-factorization of λKmh\lambda K_m^h, that is, a coloring (i.e. partition) PP of the edges of λKmh\lambda K_m^h into F1,,FkF_1,\dots, F_k such that for i=1,,ki=1,\dots,k, FiF_i is spanning and the degree of each vertex in FiF_i is at most rir_i, we find necessary and sufficient conditions that ensure PP can be extended to a connected rr-factorization of λKnh\lambda K_n^h (i.e. an rr-factorization in which each factor is connected). Moreover, we prove a general result that implies the following. Given a partial ss-factorization PP of any sub-hypergraph of λKmh\lambda K_m^h, where s:=(s1,,sq)s:=(s_1,\dots,s_q) and qq is not too big, we find necessary and sufficient conditions under which PP can be embedded into a connected rr-factorization of λKnh\lambda K_n^h. These results can be seen as unified generalizations of various classical combinatorial results such as Cruse's theorem on embedding partial symmetric latin squares, Baranyai's theorem on factorization of hypergraphs, Hilton's theorem on extending path decompositions into Hamiltonian decompositions, H\"{a}ggkvist and Hellgren's theorem on extending 1-factorizations, and Hilton, Johnson, Rodger, and Wantland's theorem on embedding connected factorizations.

Keywords

Cite

@article{arxiv.2209.06402,
  title  = {Embedding Irregular Colorings into Connected Factorizations},
  author = {Amin Bahmanian and Anna Johnsen},
  journal= {arXiv preprint arXiv:2209.06402},
  year   = {2022}
}

Comments

22 pages

R2 v1 2026-06-28T01:15:32.019Z