We show that the vertices of any plane graph in which every face is incident to at least g vertices can be colored by ¿(3g-5)/4¿ colors so that every color appears in every face. This is nearly tight, as there are plane graphs where all faces are incident to at least g vertices and that admit no vertex coloring of this type with more than ¿(3g+1)/4¿ colors. We further show that the problem of determining whether a plane graph admits a vertex coloring by k colors in which all colors appear in every face is in P for k=2 and is -complete for k=3,4. We refine this result for polychromatic 3-colorings restricted to 2-connected graphs which have face sizes from a prescribed (possibly infinite) set of integers. Thereby we find an almost complete c...
AbstractWe prove that for every integer k, every finite set of points in the plane can be k-colored ...
AbstractLet G be a plane graph with maximum face size Δ∗. If all faces of G with size four or more a...
A unique-maximum k-coloring with respect to faces of a plane graph G is a coloring with colors 1, . ...
We show that the vertices of any plane graph in which every face is incident to at least g vertices ...
AbstractWe prove that the vertices of each n-vertex plane graph G with minimum face cycle length g,g...
We consider a vertex colouring of a connected plane graph G. A colour c is used k times by a face α ...
We study vertex-colorings of plane graphs that do not contain a rainbow face, i.e., a face with vert...
The Four Color Theorem says that the faces (or vertices) of a plane graph may be colored with four c...
AbstractLet f(G) be the maximum number of colors in a vertex coloring of a simple plane graph G such...
Let G be a plane graph. A facial path of G is a subpath of the boundary walk of a face of G. We prov...
In a previous paper, the authors proved a conjecture of Melnikov that the edges and faces of a plane...
We study vertex-colorings of plane graphs that do not contain a rainbow face, i.e., a face with vert...
A vertex coloring of a plane graph is `-facial if every two distinct vertices joined by a facial wal...
AbstractA vertex coloring of a plane graph is ℓ-facial if every two distinct vertices joined by a fa...
AbstractThe edges and faces of a plane graph are colored so that every two adjacent or incident of t...
AbstractWe prove that for every integer k, every finite set of points in the plane can be k-colored ...
AbstractLet G be a plane graph with maximum face size Δ∗. If all faces of G with size four or more a...
A unique-maximum k-coloring with respect to faces of a plane graph G is a coloring with colors 1, . ...
We show that the vertices of any plane graph in which every face is incident to at least g vertices ...
AbstractWe prove that the vertices of each n-vertex plane graph G with minimum face cycle length g,g...
We consider a vertex colouring of a connected plane graph G. A colour c is used k times by a face α ...
We study vertex-colorings of plane graphs that do not contain a rainbow face, i.e., a face with vert...
The Four Color Theorem says that the faces (or vertices) of a plane graph may be colored with four c...
AbstractLet f(G) be the maximum number of colors in a vertex coloring of a simple plane graph G such...
Let G be a plane graph. A facial path of G is a subpath of the boundary walk of a face of G. We prov...
In a previous paper, the authors proved a conjecture of Melnikov that the edges and faces of a plane...
We study vertex-colorings of plane graphs that do not contain a rainbow face, i.e., a face with vert...
A vertex coloring of a plane graph is `-facial if every two distinct vertices joined by a facial wal...
AbstractA vertex coloring of a plane graph is ℓ-facial if every two distinct vertices joined by a fa...
AbstractThe edges and faces of a plane graph are colored so that every two adjacent or incident of t...
AbstractWe prove that for every integer k, every finite set of points in the plane can be k-colored ...
AbstractLet G be a plane graph with maximum face size Δ∗. If all faces of G with size four or more a...
A unique-maximum k-coloring with respect to faces of a plane graph G is a coloring with colors 1, . ...