AbstractThis note presents a generic approach to proving NP-hardness of unconstrained partition type problems, namely partitioning a given set of entities into several subsets such that a certain objective function of the partition is optimized. The idea is to represent the objective function of the problem as a function of aggregate variables, whose optimum is achieved only at the points where problem Partition (if proving ordinary NP-hardness), or problem 3-Partition or Product Partition (if proving strong NP-hardness) has a solution. The approach is demonstrated on a number of discrete optimization and scheduling problems
We study various uniform k-partition problems which consist in partitioning m sets, each of cardinal...
AbstractList partitions generalize list colourings. Sandwich problems generalize recognition problem...
The paper describes an optimization procedure for a class of discrete optimization problems which is...
AbstractThis note presents a generic approach to proving NP-hardness of unconstrained partition type...
Problem Product Partition differs from the NP-complete problem Partition in that the addition operat...
We study various uniform $k$-partition problems which consist in partitioning $m$ sets, each of car...
Abstract. We introduce a general approach for solving partition prob-lems where the goal is to repre...
The P versus NP problem is a very intriguing concept as it asks whether difficult problems have an a...
Problem Product Partition differs from the NP-complete problem Partition in that the addition operat...
The P versus NP problem is a very intriguing concept as it asks whether difficult problems have an a...
The three-partition problem is one of the most famous strongly NP-complete combinatorial problems. W...
The 3-partitioning problem is to decide whether a given multiset of nonnegative integers can be part...
Given a set of individuals, a collection of admissible subsets, and a cost associated to each of the...
AbstractWe study various uniform k-partition problems which consist in partitioning m sets, each of ...
In this note, a direct proof is given of the NP-completeness of a variant of GRAPH COLORING, i.e., a...
We study various uniform k-partition problems which consist in partitioning m sets, each of cardinal...
AbstractList partitions generalize list colourings. Sandwich problems generalize recognition problem...
The paper describes an optimization procedure for a class of discrete optimization problems which is...
AbstractThis note presents a generic approach to proving NP-hardness of unconstrained partition type...
Problem Product Partition differs from the NP-complete problem Partition in that the addition operat...
We study various uniform $k$-partition problems which consist in partitioning $m$ sets, each of car...
Abstract. We introduce a general approach for solving partition prob-lems where the goal is to repre...
The P versus NP problem is a very intriguing concept as it asks whether difficult problems have an a...
Problem Product Partition differs from the NP-complete problem Partition in that the addition operat...
The P versus NP problem is a very intriguing concept as it asks whether difficult problems have an a...
The three-partition problem is one of the most famous strongly NP-complete combinatorial problems. W...
The 3-partitioning problem is to decide whether a given multiset of nonnegative integers can be part...
Given a set of individuals, a collection of admissible subsets, and a cost associated to each of the...
AbstractWe study various uniform k-partition problems which consist in partitioning m sets, each of ...
In this note, a direct proof is given of the NP-completeness of a variant of GRAPH COLORING, i.e., a...
We study various uniform k-partition problems which consist in partitioning m sets, each of cardinal...
AbstractList partitions generalize list colourings. Sandwich problems generalize recognition problem...
The paper describes an optimization procedure for a class of discrete optimization problems which is...