On the minimal sum of edges in a signed edge-dominated graph

Abstract

Let G be a simple graph with n vertices and 1-weights on edges. Suppose that for every edge e the sum of edges adjacent to e (including e itself) is positive. Then the sum of weights over edges of G is at least -n225. Also we provide an example of a weighted graph with described properties and the sum of weights -(1+o(1))n28(1 + 2)2. The previous best known bounds were -n216 and -(1+o(1))n254 respectively. We show that the constant -1/54 is optimal under some additional conditions.