AbstractEvery graph G contains a minimum vertex-coloring with the property that at least one color class of the coloring is a maximal independent set (equivalently, a dominating set) in G. Among all such minimum vertex-colorings of the vertices of G, a coloring with the maximum number of color classes that are dominating sets in G is called a dominating-χ-coloring of G. The number of color classes that are dominating sets in a dominating-χ-coloring of G is defined to be the dominating-χ-color number of G. In this paper, we continue to investigate the dominating-χ-color number of a graph first defined and studied in [1]
AbstractGiven an independence system (E,P), the Minimum Partition Problem (MPP) seeks a partition of...
doi:10.1016/j.endm.2005.06.028 How many subgraphs of a given property can be in a graph on n vertice...
Abstract. The paper continues the study of independent set dominating sets in graphs which was start...
Every graph G contains a minimum vertex-coloring with the property that at least one color class of ...
AbstractEvery graph G contains a minimum vertex-coloring with the property that at least one color c...
International audienceIn this paper, we introduce and study a new coloring prob- lem of a graph call...
International audienceIn this paper, we introduce and study a new coloring problem of a graph called...
Color class domination partition was suggested by E. Sampathkumar and it was studied in [1]. A prope...
AbstractFor a simple graph G, the independent domination number i(G) is defined to be the minimum ca...
The chromatic number χ(G) of a graph G is the minimum number of colours required to colour the verti...
In a graph G, a vertex is said to dominate itself and all its neighbors. A dominating set of a graph...
Abstract Strong dominating amp61539- color number of a graph G is defined as the maximum number of c...
A set S ⊆ V of vertices in a graph G = (V,E) is called a dominating set if every vertex in V −S is a...
A b-coloring of a graph G by k colors is a proper vertex coloring such that every color class contai...
AbstractLet G be any graph, and also let Δ(G), χ(G) and α(G) denote the maximum degree, the chromati...
AbstractGiven an independence system (E,P), the Minimum Partition Problem (MPP) seeks a partition of...
doi:10.1016/j.endm.2005.06.028 How many subgraphs of a given property can be in a graph on n vertice...
Abstract. The paper continues the study of independent set dominating sets in graphs which was start...
Every graph G contains a minimum vertex-coloring with the property that at least one color class of ...
AbstractEvery graph G contains a minimum vertex-coloring with the property that at least one color c...
International audienceIn this paper, we introduce and study a new coloring prob- lem of a graph call...
International audienceIn this paper, we introduce and study a new coloring problem of a graph called...
Color class domination partition was suggested by E. Sampathkumar and it was studied in [1]. A prope...
AbstractFor a simple graph G, the independent domination number i(G) is defined to be the minimum ca...
The chromatic number χ(G) of a graph G is the minimum number of colours required to colour the verti...
In a graph G, a vertex is said to dominate itself and all its neighbors. A dominating set of a graph...
Abstract Strong dominating amp61539- color number of a graph G is defined as the maximum number of c...
A set S ⊆ V of vertices in a graph G = (V,E) is called a dominating set if every vertex in V −S is a...
A b-coloring of a graph G by k colors is a proper vertex coloring such that every color class contai...
AbstractLet G be any graph, and also let Δ(G), χ(G) and α(G) denote the maximum degree, the chromati...
AbstractGiven an independence system (E,P), the Minimum Partition Problem (MPP) seeks a partition of...
doi:10.1016/j.endm.2005.06.028 How many subgraphs of a given property can be in a graph on n vertice...
Abstract. The paper continues the study of independent set dominating sets in graphs which was start...