We consider the problem of partitioning a set of positive integers values into a given number of subsets, each having an associated cardinality limit, so that the maximum sum of values in a subset is minimized, and the number of values in each subset does not exceed the corresponding limit. The problem is related to scheduling and bin packing problems. We give combinatorial lower bounds, reduction criteria, constructive heuristics, a scatter search approach, and a lower bound based on column generation. The outcome of extensive computational experiments is presented
The NP-hard number-partitioning problem is to separate a multiset S of n positive integers into k su...
This paper unifies and generalizes the existing lower bounds for the one-dimensional bin packing pr...
A set of items has to be assigned to a set of bins with different sizes. If necessary the size of ea...
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...
We consider the problem of partitioning a set of positive integers values into a given number of sub...
AbstractThe bin-packing problem asks for a packing of a list of items of sizes from (0,1] into the s...
The bin-packing problem asks for a packing of a list of items of sizes from (0, 1) into the smallest...
The NP-hard number-partitioning problem is to separate a multiset S ofn positive integers into k sub...
We introduce a new combinatorial optimization problem in this article, called the minimum common int...
Bin packing is an optimizational NP-hard problem of packing items of given sizes into minimum number...
The bin packing problem asks for a packing of a list of items from (0, 1] into the smallest possible...
In this paper we consider the familiar bin-packing problem and its associated set-partitioning formu...
. The bin packing problem consists in finding the minimum number of bins of given capacity which are...
We analyze the worst-case ratio of a natural heuristic for the bin packing problem, which proceeds b...
The NP-hard number-partitioning problem is to separate a multiset S of n positive integers into k su...
This paper unifies and generalizes the existing lower bounds for the one-dimensional bin packing pr...
A set of items has to be assigned to a set of bins with different sizes. If necessary the size of ea...
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...
We consider the problem of partitioning a set of positive integers values into a given number of sub...
AbstractThe bin-packing problem asks for a packing of a list of items of sizes from (0,1] into the s...
The bin-packing problem asks for a packing of a list of items of sizes from (0, 1) into the smallest...
The NP-hard number-partitioning problem is to separate a multiset S ofn positive integers into k sub...
We introduce a new combinatorial optimization problem in this article, called the minimum common int...
Bin packing is an optimizational NP-hard problem of packing items of given sizes into minimum number...
The bin packing problem asks for a packing of a list of items from (0, 1] into the smallest possible...
In this paper we consider the familiar bin-packing problem and its associated set-partitioning formu...
. The bin packing problem consists in finding the minimum number of bins of given capacity which are...
We analyze the worst-case ratio of a natural heuristic for the bin packing problem, which proceeds b...
The NP-hard number-partitioning problem is to separate a multiset S of n positive integers into k su...
This paper unifies and generalizes the existing lower bounds for the one-dimensional bin packing pr...
A set of items has to be assigned to a set of bins with different sizes. If necessary the size of ea...