On Maximum Differential Coloring of Planar Graphs

Abstract

We study the maximum differential coloring problem, where the vertices of an n-vertex graph must be labeled with distinct numbers ranging from 1 to n, so that the minimum absolute difference between two labels of any two adjacent vertices is maximized. As the problem is for general graphs~leung1984, we consider planar graphs and subclasses thereof. We initially prove that the maximum differential coloring problem remains , even for planar graphs. Then, we present tight bounds for regular caterpillars and spider graphs. Using these new bounds, we prove that the Miller-Pritikin labeling scheme~miller89 for forests is optimal for regular caterpillars and for spider graphs. Finally, we describe close-to-optimal differential coloring algorithms for general caterpillars and biconnected triangle-free outer-planar graphs.