AbstractThe1999 Academic Pressentire chromatic number χCopyright vef(G) of a plane graphGis the least number of colors assigned to the vertices, edges and faces so that every two adjacent or incident pair of them receive different colors. Kronk and Mitchem (1973) conjectured that χvef(G)≤ Δ+4 for every plane graphG. In this paper we prove the conjecture for a plane graphGhaving χ′(G)=Δ and give a upper bound χvef(G) ≤ Δ+5 for all plane graphs, where χ′(G) and Δ are the chromatic index and the maximum degree ofG, respectively
It was conjectured by Reed [reed98conjecture] that for any graph $G$, the graph's chromatic number $...
AbstractThis paper introduces three new upper bounds on the chromatic number, without making any ass...
published source acknowledged. The original publication is available http://www.springerlink.com/co...
A cyclic colouring of a plane graph is a vertex colouring such that vertices incident with the same ...
Let G be a graph and let s be the maximum number of vertices of the same degree, each at least (∆(G)...
Abstract The edge-face chromatic number χef(G) of a plane graph G is the least number of colors assi...
AbstractWe give a new upper bound on the total chromatic number of a graph. This bound improves the ...
The Four Color Theorem says that the faces (or vertices) of a plane graph may be colored with four c...
AbstractA lower bound is obtained for the chromatic number X(G) of a graph G in terms of its vertex ...
AbstractWe prove new upper bounds on the Thue chromatic number of an arbitrary graph and on the faci...
We study the two-player game where Maker and Breaker alternately color the edges of a given graph G ...
AbstractLet G be a simple graph, let Δ(G) denote the maximum degree of its vertices, and let χ(G) de...
We prove the structural result on normal plane maps, which applies to the vertex distance colouring ...
AbstractGiven a graph G and an integer k, two players alternatively color the edges of G using k col...
AbstractFor a given graph G, denote by GΔ the subgraph of G induced by the vertices of maximum degre...
It was conjectured by Reed [reed98conjecture] that for any graph $G$, the graph's chromatic number $...
AbstractThis paper introduces three new upper bounds on the chromatic number, without making any ass...
published source acknowledged. The original publication is available http://www.springerlink.com/co...
A cyclic colouring of a plane graph is a vertex colouring such that vertices incident with the same ...
Let G be a graph and let s be the maximum number of vertices of the same degree, each at least (∆(G)...
Abstract The edge-face chromatic number χef(G) of a plane graph G is the least number of colors assi...
AbstractWe give a new upper bound on the total chromatic number of a graph. This bound improves the ...
The Four Color Theorem says that the faces (or vertices) of a plane graph may be colored with four c...
AbstractA lower bound is obtained for the chromatic number X(G) of a graph G in terms of its vertex ...
AbstractWe prove new upper bounds on the Thue chromatic number of an arbitrary graph and on the faci...
We study the two-player game where Maker and Breaker alternately color the edges of a given graph G ...
AbstractLet G be a simple graph, let Δ(G) denote the maximum degree of its vertices, and let χ(G) de...
We prove the structural result on normal plane maps, which applies to the vertex distance colouring ...
AbstractGiven a graph G and an integer k, two players alternatively color the edges of G using k col...
AbstractFor a given graph G, denote by GΔ the subgraph of G induced by the vertices of maximum degre...
It was conjectured by Reed [reed98conjecture] that for any graph $G$, the graph's chromatic number $...
AbstractThis paper introduces three new upper bounds on the chromatic number, without making any ass...
published source acknowledged. The original publication is available http://www.springerlink.com/co...