Add to ORKGWe study various uniform $k$-partition problems which consist in partitioning $m$ sets, each of cardinality $k$, into $k$ sets of cardinality $m$ such that each of these sets contains exactly one element from every original set. The problems differ according to the particular measure of "set uniformity" to be optimized. Most problems are polynomial and corresponding solution algorithms are provided. A few of them are proved to be NP-hard. Examples of applications to scheduling and routing problems are also discussed
AbstractAssume that each vertex of a graph G is assigned a nonnegative integer weight and that l and...
We present a few results and a larger number of questions concerning partitions of graphs or hypergr...
Abstract. We introduce a new combinatorial optimization problem in this paper, called theMinimum Com...
We study various uniform $k$-partition problems which consist in partitioning $m$ sets, each of car...
We study various uniform k-partition problems which consist in partitioning m sets, each of cardinal...
In this work we study various uniform $k$-partition problems which consist in partitioning a collect...
AbstractWe study various uniform k-partition problems which consist in partitioning m sets, each of ...
Abstract. We introduce a general approach for solving partition prob-lems where the goal is to repre...
AbstractThis note presents a generic approach to proving NP-hardness of unconstrained partition type...
AbstractJudicious partition problems ask for partitions of the vertex set of graphs so that several ...
AbstractWe consider the problem of partitioning a multiset of integers into k disjoint subsets whose...
We consider the problem of partitioning a set of positive integers values into a given number of sub...
We consider the problem of partitioning a set of positive integers values into a given number of sub...
AbstractThe SATISFACTORY PARTITION problem consists in deciding if a given graph has a partition of ...
The SATISFACTORY PARTITION problem consists in deciding if a given graph has a partition of its vert...
AbstractAssume that each vertex of a graph G is assigned a nonnegative integer weight and that l and...
We present a few results and a larger number of questions concerning partitions of graphs or hypergr...
Abstract. We introduce a new combinatorial optimization problem in this paper, called theMinimum Com...
We study various uniform $k$-partition problems which consist in partitioning $m$ sets, each of car...
We study various uniform k-partition problems which consist in partitioning m sets, each of cardinal...
In this work we study various uniform $k$-partition problems which consist in partitioning a collect...
AbstractWe study various uniform k-partition problems which consist in partitioning m sets, each of ...
Abstract. We introduce a general approach for solving partition prob-lems where the goal is to repre...
AbstractThis note presents a generic approach to proving NP-hardness of unconstrained partition type...
AbstractJudicious partition problems ask for partitions of the vertex set of graphs so that several ...
AbstractWe consider the problem of partitioning a multiset of integers into k disjoint subsets whose...
We consider the problem of partitioning a set of positive integers values into a given number of sub...
We consider the problem of partitioning a set of positive integers values into a given number of sub...
AbstractThe SATISFACTORY PARTITION problem consists in deciding if a given graph has a partition of ...
The SATISFACTORY PARTITION problem consists in deciding if a given graph has a partition of its vert...
AbstractAssume that each vertex of a graph G is assigned a nonnegative integer weight and that l and...
We present a few results and a larger number of questions concerning partitions of graphs or hypergr...
Abstract. We introduce a new combinatorial optimization problem in this paper, called theMinimum Com...