English

Equitable factorizations of edge-connected graphs

Combinatorics 2021-04-30 v3

Abstract

In this paper, we show that every (3k3)(3k-3)-edge-connected graph GG, under a certain condition on whose degrees, can be edge-decomposed into kk factors G1,,GkG_1,\ldots, G_k such that for each vertex vV(Gi)v\in V(G_i), dGi(v)dG(v)/k<1|d_{G_i}(v)-d_G(v)/k|< 1, where 1ik1\le i\le k. As application, we deduce that every 66-edge-connected graph GG can be edge-decomposed into three factors G1G_1, G2G_2, and G3G_3 such that for each vertex vV(Gi)v\in V(G_i), dGi(v)dG(v)/3<1|d_{G_i}(v)-d_{G}(v)/3|< 1, unless GG has exactly one vertex zz with dG(z)≢30d_G(z) \stackrel{3}{\not\equiv}0. Next, we show that every odd-(3k2)(3k-2)-edge-connected graph GG can be edge-decomposed into kk factors G1,,GkG_1,\ldots, G_k such that for each vertex vV(Gi)v\in V(G_i), dGi(v)d_{G_i}(v) and dG(v)d_G(v) have the same parity and dGi(v)dG(v)/k<2|d_{G_i}(v)-d_G(v)/k|< 2, where kk is an odd positive integer and 1ik1\le i\le k. Finally, we give a sufficient edge-connectivity condition for a graph GG to have a parity factor FF with specified odd-degree vertices such that for each vertex vv, dF(v)εdG(v)<2| d_{F}(v)-\varepsilon d_G(v)|< 2, where ε\varepsilon is a real number with 0<ε<10< \varepsilon < 1.

Keywords

Cite

@article{arxiv.1906.04325,
  title  = {Equitable factorizations of edge-connected graphs},
  author = {Morteza Hasanvand},
  journal= {arXiv preprint arXiv:1906.04325},
  year   = {2021}
}
R2 v1 2026-06-23T09:49:37.016Z