A popular approach in combinatorial optimization is to model problems as integer linear programs. Ideally, the relaxed linear program would have only integer solutions, which happens for instance when the constraint matrix is totally unimodular. Still, sometimes it is possible to build an integer solution with same cost from the fractional solution. Examples are two scheduling problems and the single disk prefetching/caching problem. We show that problems such as the three previously mentioned can be separated into two subproblems: (1) finding an optimal feasible set of slots, and (2) assigning the jobs or pages to the slots. It is straigthforward to show that the latter can be solved greedily. We are able to solve the former with a totally...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
Enumerative approaches, such as branch-and-bound, to solving optimization problems require a subrout...
In the classic Integer Programming Feasibility (IPF) problem, the objective is to decide whether, fo...
A popular approach in combinatorial optimization is to model problems as integer linear programs. Id...
In this talk, I will show how any integer linear program (ILP) defined by a constraint matrix whose ...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
Primal methods constitute a common approach to solving (combinatorial) optimization problems. Starti...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
A mixed-integer program is an optimization problem where one is required to minimize a linear functi...
. This paper describes unimodular probing -- a new technique that has been used to solve a class of ...
Column generation is a linear programming method that, when combined with appropriate integer progra...
Fractional programming is used to model problems where the objective function is a ratio of function...
Solution techniques for combinatorial optimization and integer programming problems are core discipl...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
We study the problem of finding a set of constraints of minimum cardinality which when relaxed in an...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
Enumerative approaches, such as branch-and-bound, to solving optimization problems require a subrout...
In the classic Integer Programming Feasibility (IPF) problem, the objective is to decide whether, fo...
A popular approach in combinatorial optimization is to model problems as integer linear programs. Id...
In this talk, I will show how any integer linear program (ILP) defined by a constraint matrix whose ...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
Primal methods constitute a common approach to solving (combinatorial) optimization problems. Starti...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
A mixed-integer program is an optimization problem where one is required to minimize a linear functi...
. This paper describes unimodular probing -- a new technique that has been used to solve a class of ...
Column generation is a linear programming method that, when combined with appropriate integer progra...
Fractional programming is used to model problems where the objective function is a ratio of function...
Solution techniques for combinatorial optimization and integer programming problems are core discipl...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
We study the problem of finding a set of constraints of minimum cardinality which when relaxed in an...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
Enumerative approaches, such as branch-and-bound, to solving optimization problems require a subrout...
In the classic Integer Programming Feasibility (IPF) problem, the objective is to decide whether, fo...