Add to ORKGAbstract The problem of partitioning a partially ordered set into a minimum number of chains is a well-known problem. In this paper we study a generalization of this problem, where we not only assume that the chains have bounded size, but also that a weight wi is given for each element i in the partial order such that wi ≤ wj if i ≺ j . The problem is then to partition the partial order into a minimum-weight set of chains of bounded size, where the weight of a chain equals the weight of the heaviest element in the chain. We prove that this problem is APX-hard, and we propose and analyze lower bounds for this problem. Based on these lower bounds, we exhibit a 2-approximation algorithm, and show that it is tight. We report computational resul...
Let P be a nite partially ordered set. Dilworth's theorem states that the maximal size of an an...
International audienceA well-known method to represent a partially ordered set P (order for short) c...
P = finite partially ordered set (poset) A chain in P = a linearly ordered subset of P. i.e., a0, a1...
The problem of partitioning a partially ordered set into a minimum number of chains is a well-known ...
An on-line chain partitioning algorithm receives a poset, one element at a time, and irrevocably ass...
Abstract. An algorithm is described for finding the maximal weight chain between two points in a loc...
We describe two problems and their optimal solutions for partially ordered sets. We first describe a...
We describe two problems and their optimal solutions for partially ordered sets. We rst describe an ...
AbstractLet 2[n] denote the Boolean lattice of order n, that is, the poset of subsets of {1, …, n} o...
Abstract- One of the most famous results in the theory of partially ordered sets is due to Dilworth ...
AbstractIn the partially ordered knapsack problem (POK) we are given a set N of items and a partial ...
Assume that each vertex of a graph G is assigned a nonnegative integer weight and that l and u are g...
conjecture, normalized matching property Let 2 [n] denote the Boolean lattice of order n, that is, t...
An on-line chain partitioning algorithm receives a poset, one element at a time, and irrevocably ass...
AbstractThe following general theorem is proven: Given a partially ordered set and a group of permut...
Let P be a nite partially ordered set. Dilworth's theorem states that the maximal size of an an...
International audienceA well-known method to represent a partially ordered set P (order for short) c...
P = finite partially ordered set (poset) A chain in P = a linearly ordered subset of P. i.e., a0, a1...
The problem of partitioning a partially ordered set into a minimum number of chains is a well-known ...
An on-line chain partitioning algorithm receives a poset, one element at a time, and irrevocably ass...
Abstract. An algorithm is described for finding the maximal weight chain between two points in a loc...
We describe two problems and their optimal solutions for partially ordered sets. We first describe a...
We describe two problems and their optimal solutions for partially ordered sets. We rst describe an ...
AbstractLet 2[n] denote the Boolean lattice of order n, that is, the poset of subsets of {1, …, n} o...
Abstract- One of the most famous results in the theory of partially ordered sets is due to Dilworth ...
AbstractIn the partially ordered knapsack problem (POK) we are given a set N of items and a partial ...
Assume that each vertex of a graph G is assigned a nonnegative integer weight and that l and u are g...
conjecture, normalized matching property Let 2 [n] denote the Boolean lattice of order n, that is, t...
An on-line chain partitioning algorithm receives a poset, one element at a time, and irrevocably ass...
AbstractThe following general theorem is proven: Given a partially ordered set and a group of permut...
Let P be a nite partially ordered set. Dilworth's theorem states that the maximal size of an an...
International audienceA well-known method to represent a partially ordered set P (order for short) c...
P = finite partially ordered set (poset) A chain in P = a linearly ordered subset of P. i.e., a0, a1...