AbstractThe complexity of linear programming and other problems in the geometry of d-dimensions is studied. A notion of LP-completeness is introduced, and a set of problems is shown to be (polynomially) equivalent to linear programming. Many of these problems involve computation of subsets of convex hulls of polytopes, and require O(n log n) operations for d=2. Known results are surveyed in order to give an interesting characterization for the complexity of linear programming and a transformation is given to produce NP-complete versions of LP-complete provlems
We characterize the complexity of some natural and important problems in linear algebra. In particul...
In this paper we study the parallel complexity of Positive Linear Programming (PLP), i.e. the specia...
In a linear program (LP) in standard form, we show that the problem of finding a cheapest feasible b...
AbstractThe complexity of linear programming and other problems in the geometry of d-dimensions is s...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
AbstractWe analyze the arithmetic complexity of the linear programming feasibility problem over the ...
Linear programming has many important practical applications, and has also given rise to a wide body...
The construction of the convex hull of a finite point set in a low-dimensional Euclidean space is a...
International audienceTropical geometry has been recently used to obtain new complexity results in c...
Linear Programming (LP) and Integer Linear Programming (ILP) are two of the most powerful tools ever...
We study a mixed integer linear program with m integer variables and k non-negative continu...
In this paper we study the parallel complexity of Positive Linear Programming (PLP), i.e. the specia...
In this paper we show a simple treatment of the complexity of Linear Programming. We describe the sh...
In this paper we study the parallel complexity of Positive Linear Programming (PLP), i.e. the specia...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
We characterize the complexity of some natural and important problems in linear algebra. In particul...
In this paper we study the parallel complexity of Positive Linear Programming (PLP), i.e. the specia...
In a linear program (LP) in standard form, we show that the problem of finding a cheapest feasible b...
AbstractThe complexity of linear programming and other problems in the geometry of d-dimensions is s...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
AbstractWe analyze the arithmetic complexity of the linear programming feasibility problem over the ...
Linear programming has many important practical applications, and has also given rise to a wide body...
The construction of the convex hull of a finite point set in a low-dimensional Euclidean space is a...
International audienceTropical geometry has been recently used to obtain new complexity results in c...
Linear Programming (LP) and Integer Linear Programming (ILP) are two of the most powerful tools ever...
We study a mixed integer linear program with m integer variables and k non-negative continu...
In this paper we study the parallel complexity of Positive Linear Programming (PLP), i.e. the specia...
In this paper we show a simple treatment of the complexity of Linear Programming. We describe the sh...
In this paper we study the parallel complexity of Positive Linear Programming (PLP), i.e. the specia...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
We characterize the complexity of some natural and important problems in linear algebra. In particul...
In this paper we study the parallel complexity of Positive Linear Programming (PLP), i.e. the specia...
In a linear program (LP) in standard form, we show that the problem of finding a cheapest feasible b...