AbstractWe analyze the relations between several graph transformations that were introduced to be used in procedures determining the stability number of a graph. We show that all these transformations can be decomposed into a sequence of edge deletions and twin deletions. We also show how some of these transformations are related to the notion of even pair introduced to color some classes of perfect graphs. Then, some properties of edge deletion and twin deletion are given and a conjecture is formulated about the class of graphs for which these transformations can be used to determine the stability number
AbstractThis paper considers instability of graphs in all of its possible forms. First, four theorem...
Given an undirected graph G = (V,E) and two positive integers k and d, we are interested in finding ...
AbstractGolumbic and Monma [3] introduced a subclass of perfect graphs called tolerance graphs. In t...
We analyze the relations between several graph transformations that were introduced to be used in pr...
AbstractWe analyze the relations between several graph transformations that were introduced to be us...
The effect of deleting a vertex or (deleting or adding) an edge on co-even domination number on a gr...
AbstractThe cohesion of a vertex v is the minimum number of edges whose deletion makes v a cutvertex...
AbstractWe study a transformation of pseudo-Boolean functions which, when applicable, amounts to con...
We study a transformation of pseudo-Boolean functions which, when applicable, amounts to constructin...
AbstractThe struction method is a general approach to compute the stability number of a graph based ...
AbstractThe stability method is very useful for obtaining exact solutions of many extremal graph pro...
Graph transformations proved useful for many algorithmic problems. In the present paper, we study th...
The stability method is very useful for obtaining exact solutions of many extremal graph problems. I...
Graph transformations proved useful for many algorithmic problems. In the present paper, we study th...
Graph parameters such as the clique number and the chromatic number are central in many areas, rangi...
AbstractThis paper considers instability of graphs in all of its possible forms. First, four theorem...
Given an undirected graph G = (V,E) and two positive integers k and d, we are interested in finding ...
AbstractGolumbic and Monma [3] introduced a subclass of perfect graphs called tolerance graphs. In t...
We analyze the relations between several graph transformations that were introduced to be used in pr...
AbstractWe analyze the relations between several graph transformations that were introduced to be us...
The effect of deleting a vertex or (deleting or adding) an edge on co-even domination number on a gr...
AbstractThe cohesion of a vertex v is the minimum number of edges whose deletion makes v a cutvertex...
AbstractWe study a transformation of pseudo-Boolean functions which, when applicable, amounts to con...
We study a transformation of pseudo-Boolean functions which, when applicable, amounts to constructin...
AbstractThe struction method is a general approach to compute the stability number of a graph based ...
AbstractThe stability method is very useful for obtaining exact solutions of many extremal graph pro...
Graph transformations proved useful for many algorithmic problems. In the present paper, we study th...
The stability method is very useful for obtaining exact solutions of many extremal graph problems. I...
Graph transformations proved useful for many algorithmic problems. In the present paper, we study th...
Graph parameters such as the clique number and the chromatic number are central in many areas, rangi...
AbstractThis paper considers instability of graphs in all of its possible forms. First, four theorem...
Given an undirected graph G = (V,E) and two positive integers k and d, we are interested in finding ...
AbstractGolumbic and Monma [3] introduced a subclass of perfect graphs called tolerance graphs. In t...