Add to ORKGVizing conjectured in 1963 that the domination number of the Cartesian product of two graphs is at least the product of their domination numbers; this remains one of the biggest open problems in the study of domination in graphs. Several partial results have been proven, but the conjecture has yet to be proven in general. The purpose of this thesis was to study Vizing\u27s conjecture, related results, and open problems related to the conjecture. We give a survey of classes of graphs that are known to satisfy the conjecture, and of Vizing-like inequalities and conjectures for different types of domination and graph products. We also give an improvement of the Clark-Suen inequality. Some partial results about fair domination are presented, an...
AbstractLet γ(G) denote the domination number of a simple graph G and let G□H denote the Cartesian p...
In this note we give a generalized version of Vizing's conjecture concerning the distance domination...
Vizing je leta 1968 postavil domnevo, da je dominantno število kartezičnega produkta dveh grafov več...
Vizing conjectured in 1963 that the domination number of the Cartesian product of two graphs is at l...
Vizing conjectured in 1963 that the domination number of the Cartesian product of two graphs is at l...
Vizing\u27s conjecture from 1968 asserts that the domination number of the Cartesian product of two ...
conjecture from 1968 asserts that the domination number of the Cartesian product of two graphs is at...
We introduce a new setting for dealing with the problem of the domination number of the Cartesian pr...
The study of domination in Cartesian products has received its main motivation from attempts to sett...
A dominating set D for a graph G is a subset of V(G) such that any vertex in V(G)-D has a neighbor i...
AbstractThe well-known conjecture of Vizing on the domination number of Cartesian product graphs cla...
For any graph G=(V,E), a subset S of V dominates G if all vertices are contained in the closed neigh...
In this paper, we first give a brief survey on the power domination of the Cartesian product of grap...
AbstractIn this paper, we first give a brief survey on the power domination of the Cartesian product...
AbstractLet γ(G) be the domination number of a graph G, and let G × H be the direct product of graph...
AbstractLet γ(G) denote the domination number of a simple graph G and let G□H denote the Cartesian p...
In this note we give a generalized version of Vizing's conjecture concerning the distance domination...
Vizing je leta 1968 postavil domnevo, da je dominantno število kartezičnega produkta dveh grafov več...
Vizing conjectured in 1963 that the domination number of the Cartesian product of two graphs is at l...
Vizing conjectured in 1963 that the domination number of the Cartesian product of two graphs is at l...
Vizing\u27s conjecture from 1968 asserts that the domination number of the Cartesian product of two ...
conjecture from 1968 asserts that the domination number of the Cartesian product of two graphs is at...
We introduce a new setting for dealing with the problem of the domination number of the Cartesian pr...
The study of domination in Cartesian products has received its main motivation from attempts to sett...
A dominating set D for a graph G is a subset of V(G) such that any vertex in V(G)-D has a neighbor i...
AbstractThe well-known conjecture of Vizing on the domination number of Cartesian product graphs cla...
For any graph G=(V,E), a subset S of V dominates G if all vertices are contained in the closed neigh...
In this paper, we first give a brief survey on the power domination of the Cartesian product of grap...
AbstractIn this paper, we first give a brief survey on the power domination of the Cartesian product...
AbstractLet γ(G) be the domination number of a graph G, and let G × H be the direct product of graph...
AbstractLet γ(G) denote the domination number of a simple graph G and let G□H denote the Cartesian p...
In this note we give a generalized version of Vizing's conjecture concerning the distance domination...
Vizing je leta 1968 postavil domnevo, da je dominantno število kartezičnega produkta dveh grafov več...