An improved bound for the strong clique index of graphs
Abstract
For a graph G with line graph L(G), χ(L(G)2) and ω(L(G)2) are called the strong chromatic index and strong clique index of G, respectively. A well-known conjecture of Erdős and Nešetřil (1985) posits that χ(L(G)2) 54Δ(G)2. Related to that, Faudree, Gyárfás, Schelp and Tuza (1990) conjectured that ω(L(G)2) 54Δ(G)2. We show that ω(L(G)2) 26071987Δ(G)2 < 2116Δ(G)2 improving the upper bound 43Δ(G)2 of Faron and Postle. Indeed, we make progress towards a stronger conjecture of Faron and Postle in terms of Ore-degree. For positive integers Δ and t, let ht(Δ) denote the smallest integer such that any graph G with size at least ht(Δ) and maximum degree Δ(G) Δ, contains two edges with distance at least t. An old problem of Erdős and Nešetřil (1986) concerns estimating the quantity ht(Δ) and can be thought of as the edge-version of the degree-diameter problem. Chung, Gyárfás, Tuza and Trotter established the sharp inequality h2(Δ) 54Δ2+1. We disprove two conjectures of Cambie, Cames van Batenburg, Joannis de Verclos and Kang concerning the next open case h3(Δ).
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