Artículo de publicación ISIIn this note we show a one-to-one correspondence between potentially optimal solutions to the cluster deletion problem in a graph Gand potentially optimal solutions for the minimum sum coloring problem in G(i.e. the complement graph of G). We apply this correspondence to polynomially solve the cluster deletion problem in a subclass of P4-sparse graphs that strictly includes P4-reducible graphs
grantor: University of TorontoThe sum coloring problem asks to find a vertex coloring of ...
In the Cluster Deletion problem the goal is to remove the minimum number of edges of a given graph, ...
AbstractThe sum coloring problem asks to find a vertex coloring of a given graph G, using natural nu...
Artículo de publicación ISIIn this note we show a one-to-one correspondence between potentially opti...
Paper submitted to a journal, 11/05/2014International audienceIn this note we show a one-to-one corr...
In this note we show a one-to-one correspondence between potentially optimal solutions to the cluste...
In this note we show a one-to-one correspondence between potentially optimal solutions to the cluste...
In this paper, we study the Minimum Sum Coloring (MSC) problem on P4-sparse graphs. In the MSC probl...
The Cluster Editing problem asks to transform a graph into a union of disjoint cliques in the minimu...
In a clustering problem one has to partition a set of elements into homogeneous and well-separated s...
AbstractA graph G was defined in [16] as P4-reducible, if no vertex in G belongs to more than one ch...
The well-known Cluster Vertex Deletion problem (cluster-vd) asks for a given graph G and an integer ...
Cluster Editing is the problem of turning a graph into a cluster graph, that is, a disjoint union of...
AbstractIn a clustering problem one has to partition a set of elements into homogeneous and well-sep...
Can we efficiently compute optimal solutions for a hard problem from optimal solutions to neighborin...
grantor: University of TorontoThe sum coloring problem asks to find a vertex coloring of ...
In the Cluster Deletion problem the goal is to remove the minimum number of edges of a given graph, ...
AbstractThe sum coloring problem asks to find a vertex coloring of a given graph G, using natural nu...
Artículo de publicación ISIIn this note we show a one-to-one correspondence between potentially opti...
Paper submitted to a journal, 11/05/2014International audienceIn this note we show a one-to-one corr...
In this note we show a one-to-one correspondence between potentially optimal solutions to the cluste...
In this note we show a one-to-one correspondence between potentially optimal solutions to the cluste...
In this paper, we study the Minimum Sum Coloring (MSC) problem on P4-sparse graphs. In the MSC probl...
The Cluster Editing problem asks to transform a graph into a union of disjoint cliques in the minimu...
In a clustering problem one has to partition a set of elements into homogeneous and well-separated s...
AbstractA graph G was defined in [16] as P4-reducible, if no vertex in G belongs to more than one ch...
The well-known Cluster Vertex Deletion problem (cluster-vd) asks for a given graph G and an integer ...
Cluster Editing is the problem of turning a graph into a cluster graph, that is, a disjoint union of...
AbstractIn a clustering problem one has to partition a set of elements into homogeneous and well-sep...
Can we efficiently compute optimal solutions for a hard problem from optimal solutions to neighborin...
grantor: University of TorontoThe sum coloring problem asks to find a vertex coloring of ...
In the Cluster Deletion problem the goal is to remove the minimum number of edges of a given graph, ...
AbstractThe sum coloring problem asks to find a vertex coloring of a given graph G, using natural nu...