Immersions and Albertson's conjecture
Abstract
A graph is said to contain Kk (a clique of size k) as a weak immersion if it has k vertices, pairwise connected by edge-disjoint paths. In 1989, Lescure and Meyniel made the following conjecture related to Hadwiger's conjecture: Every graph of chromatic number k contains Kk as a weak immersion. We prove this conjecture for graphs with at most (1.64-o(1))k vertices. As an application, we make some progress on Albertson's conjecture, according to which every graph G with chromatic number k satisfies cr(G) ≥ cr(Kk). In particular, we show that the conjecture is true for all graphs of chromatic number k, provided that they have at most (1.64-o(1))k vertices.
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