The strong chromatic index of sparse graphs

A coloring of the edges of a graph $G$ is strong if each color class is an induced matching of $G$. The strong chromatic index of $G$, denoted by $\chi_{s}^{\prime}(G)$, is the least number of colors in a strong edge coloring of $G$. In this note we prove that $\chi_{s}^{\prime}(G)\leq (4k-1)\Delta (G)-k(2k+1)+1$ for every $k$-degenerate graph $G$. This confirms the strong version of conjecture stated recently by Chang and Narayanan [3]. Our approach allows also to improve the upper bound from [3] for chordless graphs. We get that $% \chi_{s}^{\prime}(G)\leq 4\Delta -3$ for any chordless graph $G$. Both bounds remain valid for the list version of the strong edge coloring of these graphs.

[1]  Mohammad Mahdian,et al.  The strong chromatic index of C 4 -free graphs , 2000 .

[2]  Richard A. Brualdi,et al.  Incidence and strong edge colorings of graphs , 1993, Discret. Math..

[3]  Zsolt Tuza,et al.  Induced matchings in bipartite graphs , 1989, Discret. Math..

[4]  Madhav V. Marathe,et al.  Strong edge coloring for channel assignment in wireless radio networks , 2006, Fourth Annual IEEE International Conference on Pervasive Computing and Communications Workshops (PERCOMW'06).

[5]  Gerard J. Chang,et al.  Strong Chromatic Index of 2‐Degenerate Graphs , 2013, J. Graph Theory.

[6]  Bruce A. Reed,et al.  A Bound on the Strong Chromatic Index of a Graph, , 1997, J. Comb. Theory B.

[7]  R. Schelp,et al.  THE STRONG CHROMATIC INDEX OF GRAPHS , 1990 .

[8]  Tao Wang,et al.  Strong chromatic index of k-degenerate graphs , 2013, Discret. Math..

[9]  Mohammad Mahdian,et al.  The strong chromatic index of C4-free graphs , 2000, Random Struct. Algorithms.

[10]  Noga Alon,et al.  Nearly complete graphs decomposable into large induced matchings and their applications , 2011, STOC '12.

[11]  Frank Harary,et al.  Graph Theory , 2016 .