Digraphs whose m-step competition graphs are trees

Abstract

In this paper, we completely characterize the digraphs of order n whose m-step competition graphs are star graphs for positive integers 2≤ m < n. This result in matrix version identifies the solution set to the matrix equation Xm(XT)m= n+In for positive integers 2≤ m < n where In is the identity matrix of order n and n is a (0,1) Boolean matrix such that the first row and the first column consist of 1's except (1,1)-entry and the remaining entries are 0, which is the adjacency matrix of a star graph of order n. We also derive meaningful properties of the digraphs whose m-step competition graphs are trees. In the process, we extend a result of Helleloid~[Connected triangle-free m-step competition graphs, Discrete Appl.\ Math.\ 145 (2005) 376--383] by showing that for all positive integers m ≥ 2 and n, the connected triangle-free m-step competition graph on n vertices is a tree.