The Optimization of Signed Trees

Abstract

A signed graph G is a graph where each edge is assigned a + (positive edge) or a - (negative edge). The signed degree of a vertex v in a signed graph, denoted by sdeg(v), is the number of positive edges incident to v subtracted by the number of negative edges incident to v. Finally, we say G realizes the set D if: D = \sdeg(v) : v∈ V(G) \. The topic of signed degree sets and signed degree sequences has been studied from many directions. In this paper, we study properties needed for signed trees to have a given signed degree set. We start by proving that D is the signed degree set of a tree if and only if 1∈ D or -1∈ D. Further, for every valid set D, we find the smallest diameter that a tree must have to realize D. Lastly, for valid sets D with nonnegative numbers, we find the smallest order that a tree must have to realize D.