Immersions of large cliques in graphs with independence number 2 and bounded maximum degree

Abstract

An immersion of a graph H in a graph G is a minimal subgraph I of G for which there is an injection i V(H) V(I) and a set of edge-disjoint paths \Pe: e ∈ E(H)\ in I such that the end vertices of Puv are precisely i(u) and i(v). The immersion analogue of Hadwiger Conjecture (1943), posed by Lescure and Meyniel (1985), asks whether every graph G contains an immersion of K(G). Its restriction to graphs with independence number 2 has received some attention recently, and Vergara (2017) raised the weaker conjecture that every graph with independence number 2 has an immersion of K(G). This implies that every graph with independence number 2 has an immersion of K n/2 . In this paper, we verify Vergara Conjecture for graphs with bounded maximum degree. Specifically, we prove that if G is a graph with independence number 2, maximum degree less than 2n/3 - 1 and clique covering number at most 3, then G contains an immersion of K(G) (and thus of K n/2 ). Using a result of Jin (1995), this implies that if G is a graph with independence number 2 and maximum degree less than 19n/29 - 1, then G contains an immersion of K(G) (and thus of K n/2 ).