English

A Brooks-type result for sparse critical graphs

Combinatorics 2017-04-05 v3

Abstract

A graph GG is kk-{\em critical} if it has chromatic number kk, but every proper subgraph of GG is (k1)(k-1)--colorable. Let fk(n)f_k(n) denote the minimum number of edges in an nn-vertex kk-critical graph. Recently the authors gave a lower bound, fk(n)(k+1)(k2)V(G)k(k3)2(k1)f_k(n) \geq \left\lceil \frac{(k+1)(k-2)|V(G)|-k(k-3)}{2(k-1)}\right\rceil, that solves a conjecture by Gallai from 1963 and is sharp for every n1(modk1)n\equiv 1\,({\rm mod }\, k-1). It is also sharp for k=4k=4 and every n6n\geq 6. In this paper we refine the result by describing all nn-vertex kk-critical graphs GG with E(G)=(k+1)(k2)V(G)k(k3)2(k1)|E(G)|= \frac{(k+1)(k-2)|V(G)|-k(k-3)}{2(k-1)}. In particular, this result implies exact values of f5(n)f_5(n) when n7n\geq 7.

Keywords

Cite

@article{arxiv.1408.0846,
  title  = {A Brooks-type result for sparse critical graphs},
  author = {Alexandr Kostochka and Matthew Yancey},
  journal= {arXiv preprint arXiv:1408.0846},
  year   = {2017}
}

Comments

arXiv admin note: text overlap with arXiv:1209.1050

R2 v1 2026-06-22T05:20:22.942Z