Injective Edge Chromatic Index of Generalized Petersen Graphs

Abstract

An injective k-edge coloring of a graph \(G=(V(G),E(G))\) is a k-edge coloring \(\varphi \) of G such that \(\varphi (e_1)\ne \varphi (e_3)\) for any three consecutive edges \(e_1,e_2\) and \(e_3\) of a path or a 3-cycle. The injective edge chromatic index of G, denoted by \(\chi _i'(G)\), is the minimum k such that G has an injective k-edge coloring. In this paper, we consider the injective edge coloring of the generalized Petersen graph P(n, k). We show that \(\chi _i'(P(n,k))\le 4\) if \(n\equiv 0(mod~4)\) and \(k\equiv 1(mod~2)\); and \(\chi _i'(P(n,k))\le 5\) if \(n\equiv 2(mod~4)\) and \(k\equiv 1(mod~2)\). Moreover, \(\chi _i'(P(n,3))\le 5\), \(\chi _i'(P(2k+1,k))\le 5\) and \(\chi _i'(P(2k+2,k))\le 5\).