The complexity of linear programming is discussed in the "integer" and "real number" models of computation. Even though the integer model is widely used in theoretical computer science, the real number model is more useful for estimating an algorithm's running time in actual computation. Although the ellipsoid algorithm is a polynomial-time algorithm in the integer model, we prove that it has unbounded complexity in the real number model. We conjecture that there exists no polynomial-time algorithm for the linear inequalities problem in the real number model. We also conjecture that linear inequalities are strictly harder than linear equalities in all "reasonable" models of computation
AbstractWe consider the Blum–Shub–Smale model of computation over the reals. It was shown that the L...
AbstractThe complexity of evaluating integers and polynomials is studied. A new model is proposed fo...
We characterize the complexity of some natural and important problems in linear algebra. In particul...
AbstractThe complexity of linear programming and other problems in the geometry of d-dimensions is s...
AbstractThe complexity of linearly constrained (nonconvex) quadratic programming is analyzed within ...
In this paper we show a simple treatment of the complexity of Linear Programming. We describe the sh...
AbstractWe analyze the arithmetic complexity of the linear programming feasibility problem over the ...
Introduction to Linear Programming Linear programming is a very important class of problems, both a...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
We study two quite different approaches to understanding the complexity of fundamental problems in n...
AbstractWe present a linear problem whose information complexity is finite but whose combinatory com...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
The thesis begins by giving background in linear programming and Simplex methods. Topics covered inc...
We show that the ellipsoid method for solving linear programs can be implemented in a way that respe...
We briefly survey recent computational complexity results for certain algebraic problems that are re...
AbstractWe consider the Blum–Shub–Smale model of computation over the reals. It was shown that the L...
AbstractThe complexity of evaluating integers and polynomials is studied. A new model is proposed fo...
We characterize the complexity of some natural and important problems in linear algebra. In particul...
AbstractThe complexity of linear programming and other problems in the geometry of d-dimensions is s...
AbstractThe complexity of linearly constrained (nonconvex) quadratic programming is analyzed within ...
In this paper we show a simple treatment of the complexity of Linear Programming. We describe the sh...
AbstractWe analyze the arithmetic complexity of the linear programming feasibility problem over the ...
Introduction to Linear Programming Linear programming is a very important class of problems, both a...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
We study two quite different approaches to understanding the complexity of fundamental problems in n...
AbstractWe present a linear problem whose information complexity is finite but whose combinatory com...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
The thesis begins by giving background in linear programming and Simplex methods. Topics covered inc...
We show that the ellipsoid method for solving linear programs can be implemented in a way that respe...
We briefly survey recent computational complexity results for certain algebraic problems that are re...
AbstractWe consider the Blum–Shub–Smale model of computation over the reals. It was shown that the L...
AbstractThe complexity of evaluating integers and polynomials is studied. A new model is proposed fo...
We characterize the complexity of some natural and important problems in linear algebra. In particul...