Distance-k Domination Number in Triangular Matchstick Graphs

Abstract

A distance-k dominating set of a graph is a set of vertices such that every vertex lies within distance k of some vertex in the set; its minimum size is the distance-k domination number gammak. We study gammak for triangular matchstick graphs Td. Harris et al. (2020) claimed two upper bounds for the cases k=1 and k=2. These bounds are shown to be incorrect and are replaced by a corrected general upper bound for gammak(Td) obtained by refining their tiling method. For k=1 and d=7q+beta, where 0 <= beta <= 6, we further sharpen this construction and prove gamma(T7q+beta) <= 3.5q2+(beta+4.5)q+(beta-1). Finally, we determine the radius of Td as rd = ceil(2d/3), which implies gammak(Td)=1 whenever k >= rd.