English

Partitioning a graph into highly connected subgraphs

Combinatorics 2015-07-28 v2

Abstract

Given k1k\ge 1, a kk-proper partition of a graph GG is a partition P{\mathcal P} of V(G)V(G) such that each part PP of P{\mathcal P} induces a kk-connected subgraph of GG. We prove that if GG is a graph of order nn such that δ(G)n\delta(G)\ge \sqrt{n}, then GG has a 22-proper partition with at most n/δ(G)n/\delta(G) parts. The bounds on the number of parts and the minimum degree are both best possible. We then prove that If GG is a graph of order nn with minimum degree δ(G)c(k1)n\delta(G)\ge\sqrt{c(k-1)n}, where c=2123180c=\frac{2123}{180}, then GG has a kk-proper partition into at most cnδ(G)\frac{cn}{\delta(G)} parts. This improves a result of Ferrara, Magnant and Wenger [Conditions for Families of Disjoint kk-connected Subgraphs in a Graph, Discrete Math. 313 (2013), 760--764] and both the degree condition and the number of parts are best possible up to the constant cc.

Keywords

Cite

@article{arxiv.1401.2696,
  title  = {Partitioning a graph into highly connected subgraphs},
  author = {Valentin Borozan and Michael Ferrara and Shinya Fujita and Michitaka Furuya and Yannis Manoussakis and N. Narayanan and Derrick Stolee},
  journal= {arXiv preprint arXiv:1401.2696},
  year   = {2015}
}
R2 v1 2026-06-22T02:43:42.683Z