An (r − 1, 1)-coloring of an r-regular graph G is an edge coloring (with arbitrarily many colors) such that each vertex is incident to r − 1 edges of one color and 1 edge of a different color. In this paper, we completely characterize all 4-regular pseudographs (graphs that may contain parallel edges and loops) which do not have a (3, 1)-coloring. Also, for each r ≥ 6 we construct graphs that are not (r −1, 1)-colorable and, more generally, are not (r − t, t)-colorable for small t
A locally irregular graph is a graph in which the end vertices of every edge have distinct degrees. ...
The Petersen coloring of 3-regular graph G is equivalent to the normal coloring by five colors. The ...
AbstractThe class C of graphs that do not contain a cycle with a unique chord was recently studied b...
AbstractAn irregular coloring of a graph is a proper vertex coloring that distinguishes vertices in ...
AbstractA b-coloring is a coloring of the vertices of a graph such that each color class contains a ...
AbstractA general framework for coloring problems is described; the concept of regular coloring is i...
AbstractThe b-chromatic number of a graph G, denoted by φ(G), is the largest integer k for which G a...
An irregular coloring of a graph is a proper vertex coloring that distinguishes vertices in the grap...
AbstractIt is shown that two sorts of problems belong to the NP-complete class. First, it is proven ...
Given an edge-coloring of a graph G, we associate to every vertex v of G the set of colors appearing...
AbstractAigner et al., proved that for the irregular coloring number c(G) of a simple 2-regular grap...
We study the graph coloring problem under two kinds of simultaneous restrictions. First we forbid so...
AbstractA general type of edge colorings is described which includes many known colorings. Necessary...
AbstractWe discuss the following conjecture: If G = (V, E) is a Δ-regular simple graph with an even ...
AbstractThe b-chromatic number of a graph G is the largest integer k, such that G admits a proper k-...
A locally irregular graph is a graph in which the end vertices of every edge have distinct degrees. ...
The Petersen coloring of 3-regular graph G is equivalent to the normal coloring by five colors. The ...
AbstractThe class C of graphs that do not contain a cycle with a unique chord was recently studied b...
AbstractAn irregular coloring of a graph is a proper vertex coloring that distinguishes vertices in ...
AbstractA b-coloring is a coloring of the vertices of a graph such that each color class contains a ...
AbstractA general framework for coloring problems is described; the concept of regular coloring is i...
AbstractThe b-chromatic number of a graph G, denoted by φ(G), is the largest integer k for which G a...
An irregular coloring of a graph is a proper vertex coloring that distinguishes vertices in the grap...
AbstractIt is shown that two sorts of problems belong to the NP-complete class. First, it is proven ...
Given an edge-coloring of a graph G, we associate to every vertex v of G the set of colors appearing...
AbstractAigner et al., proved that for the irregular coloring number c(G) of a simple 2-regular grap...
We study the graph coloring problem under two kinds of simultaneous restrictions. First we forbid so...
AbstractA general type of edge colorings is described which includes many known colorings. Necessary...
AbstractWe discuss the following conjecture: If G = (V, E) is a Δ-regular simple graph with an even ...
AbstractThe b-chromatic number of a graph G is the largest integer k, such that G admits a proper k-...
A locally irregular graph is a graph in which the end vertices of every edge have distinct degrees. ...
The Petersen coloring of 3-regular graph G is equivalent to the normal coloring by five colors. The ...
AbstractThe class C of graphs that do not contain a cycle with a unique chord was recently studied b...