New inequalities on the hyperbolicity constant of line graphs

Abstract

If X is a geodesic metric space and x1,x2,x3∈ X, a geodesic triangle T=\x1,x2,x3\ is the union of the three geodesics [x1x2], [x2x3] and [x3x1] in X. The space X is δ-hyperbolic (in the Gromov sense) if any side of T is contained in a δ-neighborhood of the union of the two other sides, for every geodesic triangle T in X. We denote by δ(X) the sharp hyperbolicity constant of X, i.e. δ(X):=∈f\δ 0: \, X \, is δ-hyperbolic\,\\,. The main result of this paper is the inequality δ(G) δ( L(G)) for the line graph L(G) of every graph G. We prove also the upper bound δ( L(G)) 5 δ(G)+ 3 lmax, where lmax is the supremum of the lengths of the edges of G. Furthermore, if every edge of G has length k, we obtain δ(G) δ( L(G)) 5 δ(G)+ 5k/2.