Add to ORKGTo determine the chromatic number of a graph, we seek to partition the vertices into minimum number of independent sets. Similarly, for arboricity, we seek to partition the vertices into minimum number of sets, each of which induces a forest. Both problems seek to partition the vertices into sets that induce a sparse subgraph, and both are NP-hard in general and can be solved in polynomial time on cographs. In this thesis, we consider a mixed problem, where a graph is partitioned into p forests and q independent sets. It is known that for each p and q, the partition problem has a finite complete set of minimal cograph obstructions. For the cases where p = 0 or p = 1, a minimal obstruction characterization of (p, q) partitionability of cogra...
Graph partitioning problems enjoy many practical applications as well as algorithmic and theoretical...
In an earlier paper we gave efficient algorithms for partitioning chordal graphs into k independent ...
Consider the general partitioning (GP) problem defined as follows: Partition the vertices of a graph...
AbstractGiven integers j and k and a graph G, we consider partitions of the vertex set of G into j+k...
AbstractCographs form the minimal family of graphs containing K1 that is closed with respect to comp...
AbstractGiven an independence system (E,P), the Minimum Partition Problem (MPP) seeks a partition of...
Let G be an edge-colored graph. We show in this paper that it is NP-hard to find the minimum number ...
AbstractWe consider the following generalization of split graphs: A graph is said to be a (k,ℓ)-grap...
AbstractWe consider the problem of partitioning the node set of a graph into p cliques and k stable ...
AbstractAssume that each vertex of a graph G is assigned a nonnegative integer weight and that l and...
AbstractIn this paper partition problems into k independent sets or cliques of bounded size k′ are a...
AbstractGiven integers j and k and a graph G, we consider partitions of the vertex set of G into j+k...
We consider the following generalization of split graphs: A graph is said to be a (k,ℓ)-graph if its...
The study of vertex partitions of planar graphs was initiated by the Four Colour Theorem, which was ...
Consider the general partitioning (GP) problem defined as follows: Partition the vertices of a graph...
Graph partitioning problems enjoy many practical applications as well as algorithmic and theoretical...
In an earlier paper we gave efficient algorithms for partitioning chordal graphs into k independent ...
Consider the general partitioning (GP) problem defined as follows: Partition the vertices of a graph...
AbstractGiven integers j and k and a graph G, we consider partitions of the vertex set of G into j+k...
AbstractCographs form the minimal family of graphs containing K1 that is closed with respect to comp...
AbstractGiven an independence system (E,P), the Minimum Partition Problem (MPP) seeks a partition of...
Let G be an edge-colored graph. We show in this paper that it is NP-hard to find the minimum number ...
AbstractWe consider the following generalization of split graphs: A graph is said to be a (k,ℓ)-grap...
AbstractWe consider the problem of partitioning the node set of a graph into p cliques and k stable ...
AbstractAssume that each vertex of a graph G is assigned a nonnegative integer weight and that l and...
AbstractIn this paper partition problems into k independent sets or cliques of bounded size k′ are a...
AbstractGiven integers j and k and a graph G, we consider partitions of the vertex set of G into j+k...
We consider the following generalization of split graphs: A graph is said to be a (k,ℓ)-graph if its...
The study of vertex partitions of planar graphs was initiated by the Four Colour Theorem, which was ...
Consider the general partitioning (GP) problem defined as follows: Partition the vertices of a graph...
Graph partitioning problems enjoy many practical applications as well as algorithmic and theoretical...
In an earlier paper we gave efficient algorithms for partitioning chordal graphs into k independent ...
Consider the general partitioning (GP) problem defined as follows: Partition the vertices of a graph...