AbstractThe chromatic sum of a graph is the minimum total of the colors on the vertices taken over all possible proper colorings using positive integers. Erdös et al [Graphs that require many colors to achieve their chromatic sum, Congr. Numer. 71 (1990) 17–28.] considered the question of finding graphs with minimum number of vertices that require t colors beyond their chromatic number k to obtain their chromatic sum. The number of vertices of such graphs is denoted by P(k,t). They presented some upper bounds for this parameter by introducing certain constructions. In this paper we give some lower bounds for P(k,t) and considerably improve the upper bounds by introducing a class of graphs, called tabular graphs. Finally, for fixed t and suf...
AbstractWe consider the sum coloring (chromatic sum) problem and the sum multi-coloring problem for ...
The colouring number of a graph G, defined as col(G) = 1 + maxH⊆G δ(H), is an upper bound for its c...
The notion of the b-chromatic number of a graph attracted much research interests and recently a new...
AbstractThe chromatic sum of a graph is the minimum total of the colors on the vertices taken over a...
The chromatic sum of a graph is the smallest sum of colors among all proper colorings with natural n...
grantor: University of TorontoThe sum coloring problem asks to find a vertex coloring of ...
AbstractThe SUM COLORING problem consists of assigning a color c(vi)∈Z+ to each vertex vi∈V of a gra...
International audienceThe Minimum Sum Coloring Problem (MSCP) is derived from the Graph Coloring Pro...
International audienceThe Minimum Sum Colouring Problem (MSCP) is a vertex colouring problem with a ...
In this paper we show upper bounds for the sum and the product of the lower domination parameters an...
AbstractThe sum coloring problem asks to find a vertex coloring of a given graph G, using natural nu...
We recall that the minimum number of colors that allow a proper coloring of graph $G$ is called the ...
A Nordhaus-Gaddum-type result is a (tight) lower or upper bound on the sum or product of a parameter...
AbstractThe strength of a graph G is the smallest integer s such that there exists a minimum sum col...
Given graphs G and H, a vertex coloring c : V (G) →ℕ is an H-free coloring of G if no color class co...
AbstractWe consider the sum coloring (chromatic sum) problem and the sum multi-coloring problem for ...
The colouring number of a graph G, defined as col(G) = 1 + maxH⊆G δ(H), is an upper bound for its c...
The notion of the b-chromatic number of a graph attracted much research interests and recently a new...
AbstractThe chromatic sum of a graph is the minimum total of the colors on the vertices taken over a...
The chromatic sum of a graph is the smallest sum of colors among all proper colorings with natural n...
grantor: University of TorontoThe sum coloring problem asks to find a vertex coloring of ...
AbstractThe SUM COLORING problem consists of assigning a color c(vi)∈Z+ to each vertex vi∈V of a gra...
International audienceThe Minimum Sum Coloring Problem (MSCP) is derived from the Graph Coloring Pro...
International audienceThe Minimum Sum Colouring Problem (MSCP) is a vertex colouring problem with a ...
In this paper we show upper bounds for the sum and the product of the lower domination parameters an...
AbstractThe sum coloring problem asks to find a vertex coloring of a given graph G, using natural nu...
We recall that the minimum number of colors that allow a proper coloring of graph $G$ is called the ...
A Nordhaus-Gaddum-type result is a (tight) lower or upper bound on the sum or product of a parameter...
AbstractThe strength of a graph G is the smallest integer s such that there exists a minimum sum col...
Given graphs G and H, a vertex coloring c : V (G) →ℕ is an H-free coloring of G if no color class co...
AbstractWe consider the sum coloring (chromatic sum) problem and the sum multi-coloring problem for ...
The colouring number of a graph G, defined as col(G) = 1 + maxH⊆G δ(H), is an upper bound for its c...
The notion of the b-chromatic number of a graph attracted much research interests and recently a new...