We investigate the behavior of randomized simplex algorithms on special linear programs. For this, we use combinatorial models for the Klee-Minty cubes [22] and similar linear programs with exponential decreasing paths. The analysis of two most natural randomized pivot rules on the Klee-Minty cubes leads to (nearly) quadratic lower bounds for the complexity of linear programming with random pivots. Thus we disprove two bounds (for the expected running time of the random-edge simplex algorithm on Klee-Minty cubes) conjectured in the literature. At the same time, we establish quadratic upper bounds for the expected length of a path for a simplex algorithm with random pivots on the classes of linear programs under investigation. In contrast to...
We show that the pivoting process associated with one line and n points in r-dimensional space may n...
The behavior of the simplex algorithm is a widely studied subject. Specifically, the question of the...
The Klee-Minty cube is a well-known worst case example for which the simplex method takes an exponen...
We show that a variant of the random-edge pivoting rule results in a strongly polynomial time simple...
We analyze a randomized pivoting process involving one line and n points in the plane. The process m...
In the first part of the paper we survey some far-reaching applications of the basic facts of linear...
In the first part of the paper we survey some far reaching applications of the basis facts of linear...
We investigate the behavior of randomized simplex algorithms on special linear programs. For this, w...
The smoothed analysis of algorithms is concerned with the expected running time of an algor...
The thesis begins by giving background in linear programming and Simplex methods. Topics covered inc...
A Linear Program is a problem where the goal is to maximize a linear function subject to a set of li...
The authors present a randomized simplex algorithm for solving LP Problems, which has polynomial (in...
The Simplex algorithm is one of the most important algorithms in discrete optimization, and is the m...
Abstract. Viewed geometrically, the simplex algorithm on a (primally and dually non-degenerate) line...
In the rst part of the paper we survey some far-reaching applications of the basic facts of linear p...
We show that the pivoting process associated with one line and n points in r-dimensional space may n...
The behavior of the simplex algorithm is a widely studied subject. Specifically, the question of the...
The Klee-Minty cube is a well-known worst case example for which the simplex method takes an exponen...
We show that a variant of the random-edge pivoting rule results in a strongly polynomial time simple...
We analyze a randomized pivoting process involving one line and n points in the plane. The process m...
In the first part of the paper we survey some far-reaching applications of the basic facts of linear...
In the first part of the paper we survey some far reaching applications of the basis facts of linear...
We investigate the behavior of randomized simplex algorithms on special linear programs. For this, w...
The smoothed analysis of algorithms is concerned with the expected running time of an algor...
The thesis begins by giving background in linear programming and Simplex methods. Topics covered inc...
A Linear Program is a problem where the goal is to maximize a linear function subject to a set of li...
The authors present a randomized simplex algorithm for solving LP Problems, which has polynomial (in...
The Simplex algorithm is one of the most important algorithms in discrete optimization, and is the m...
Abstract. Viewed geometrically, the simplex algorithm on a (primally and dually non-degenerate) line...
In the rst part of the paper we survey some far-reaching applications of the basic facts of linear p...
We show that the pivoting process associated with one line and n points in r-dimensional space may n...
The behavior of the simplex algorithm is a widely studied subject. Specifically, the question of the...
The Klee-Minty cube is a well-known worst case example for which the simplex method takes an exponen...