Add to ORKGGiven a vertex coloring c of a graph, the neighborhood color set of a vertex is defined to be the set of all of its neighbors’ colors. The coloring c is called a set coloring if any two adjacent vertices have different neighborhood color sets. The set chromatic number χs(G) of a graph G is the minimum number of colors required in a set coloring of G. In this work, we investigate a total analog of set colorings, that is, we study set colorings of the total graph of graphs. Given a graph G = (V; E); its total graph T (G) is the graph whose vertex set is V ∪ E and in which two vertices are adjacent if and only if their corresponding elements in G are adjacent or incident. First; we establish sharp bounds for the set chromatic number of the tot...
Abstract. For a nontrivial connected graph G, let c: V (G) → N be a vertex coloring of G where adjac...
AbstractLet G=(V,E) be a graph and f:(V∪E)→[k] be a proper total k-coloring of G. We say that f is a...
A well-studied concept is that of the total chromatic number. A proper total colouring of a graph is...
Given a vertex coloring c of a graph, the neighborhood color set of a vertex is defined to be the se...
Given a vertex coloring c of a graph, the neighborhood color set of a vertex is defined to be the se...
Given a vertex coloring c of a graph, the neighborhood color set of a vertex is defined to be the se...
For a nontrivial connected graph G, let c : V (G) → ℕ be a vertex coloring of G where adjacent vert...
In the area of graph colorings, much research has been done on the topic of neighbor- distinguishing...
summary:For a nontrivial connected graph $G$, let $c\: V(G)\to \Bbb N$ be a vertex coloring of $G$...
summary:For a nontrivial connected graph $G$, let $c\: V(G)\to \Bbb N$ be a vertex coloring of $G$...
For a nontrivial connected graph G, let c: V(G)→ N be a vertex coloring of G where adjacent vertices...
For a simple connected graph G; let c : V (G) → N be a vertex coloring of G; where adjacent vertices...
summary:For a nontrivial connected graph $G$, let $c\colon V(G)\rightarrow \mathbb {N}$ be a vertex ...
summary:For a nontrivial connected graph $G$, let $c\colon V(G)\rightarrow \mathbb {N}$ be a vertex ...
A total coloring of a graph is a proper coloring in which no two adjacent or incident graph elements...
Abstract. For a nontrivial connected graph G, let c: V (G) → N be a vertex coloring of G where adjac...
AbstractLet G=(V,E) be a graph and f:(V∪E)→[k] be a proper total k-coloring of G. We say that f is a...
A well-studied concept is that of the total chromatic number. A proper total colouring of a graph is...
Given a vertex coloring c of a graph, the neighborhood color set of a vertex is defined to be the se...
Given a vertex coloring c of a graph, the neighborhood color set of a vertex is defined to be the se...
Given a vertex coloring c of a graph, the neighborhood color set of a vertex is defined to be the se...
For a nontrivial connected graph G, let c : V (G) → ℕ be a vertex coloring of G where adjacent vert...
In the area of graph colorings, much research has been done on the topic of neighbor- distinguishing...
summary:For a nontrivial connected graph $G$, let $c\: V(G)\to \Bbb N$ be a vertex coloring of $G$...
summary:For a nontrivial connected graph $G$, let $c\: V(G)\to \Bbb N$ be a vertex coloring of $G$...
For a nontrivial connected graph G, let c: V(G)→ N be a vertex coloring of G where adjacent vertices...
For a simple connected graph G; let c : V (G) → N be a vertex coloring of G; where adjacent vertices...
summary:For a nontrivial connected graph $G$, let $c\colon V(G)\rightarrow \mathbb {N}$ be a vertex ...
summary:For a nontrivial connected graph $G$, let $c\colon V(G)\rightarrow \mathbb {N}$ be a vertex ...
A total coloring of a graph is a proper coloring in which no two adjacent or incident graph elements...
Abstract. For a nontrivial connected graph G, let c: V (G) → N be a vertex coloring of G where adjac...
AbstractLet G=(V,E) be a graph and f:(V∪E)→[k] be a proper total k-coloring of G. We say that f is a...
A well-studied concept is that of the total chromatic number. A proper total colouring of a graph is...