Add to ORKGCriss-cross methods are pivot algorithms that solve linear programming problems in one phase starting with any basic solution. The first finite criss-cross method was invented by Chang, Terlaky and Wang independently. Unlike the simplex method that follows a monotonic edge path on the feasible region, the trace of a criss-cross method is neither monotonic (with respect to the objective function) nor feasibility preserving. The main purpose of this paper is to present mathematical ideas and proof techniques behind finite criss-cross pivot methods. A recent result on the existence of a short admissible pivot path to an optimal basis is given, indicating shortest pivot paths from any basis might be indeed short for criss-cross type algorithms....
The simplex method, created by George Dantzig, optimally solves a linear program by pivoting. Dantzi...
AbstractSpecially structured linear complementarity problems (LCPs) and their solution by the criss-...
Randomly-generated linear programming problems of three different types and five different sizes wer...
Criss-cross methods are pivot algorithms that solve linear programming problems in one phase startin...
Criss-cross methods are pivot algorithms that solve linear programming problems in one phase startin...
Criss-cross methods are pivot algorithms that solve linear programming problems in one phase startin...
textabstractIn this paper we generalize the so-called first-in-last-out pivot rule and the most-ofte...
This thesis describes the criss-cross method, which solves the tasks of linear programming and does ...
Linear programming is perhaps the most useful tool in optimization, much of it's success owed to the...
We present a new admissible pivot method for linear programming that works with a sequence of improv...
This thesis studies the classical finite pivot methods for solving linear programs and their efficie...
While variants of the steepest edge pivoting rule are commonly used in linear programming codes they...
A simple idea used in many combinatorial algorithms is the idea of pivoting. Originally, it comes fr...
AbstractOur paper presents a new finite crisscross method for oriented matroids. Starting from a nei...
A simple idea used in many combinatorial algorithms is the idea of pivoting. Originally,...
The simplex method, created by George Dantzig, optimally solves a linear program by pivoting. Dantzi...
AbstractSpecially structured linear complementarity problems (LCPs) and their solution by the criss-...
Randomly-generated linear programming problems of three different types and five different sizes wer...
Criss-cross methods are pivot algorithms that solve linear programming problems in one phase startin...
Criss-cross methods are pivot algorithms that solve linear programming problems in one phase startin...
Criss-cross methods are pivot algorithms that solve linear programming problems in one phase startin...
textabstractIn this paper we generalize the so-called first-in-last-out pivot rule and the most-ofte...
This thesis describes the criss-cross method, which solves the tasks of linear programming and does ...
Linear programming is perhaps the most useful tool in optimization, much of it's success owed to the...
We present a new admissible pivot method for linear programming that works with a sequence of improv...
This thesis studies the classical finite pivot methods for solving linear programs and their efficie...
While variants of the steepest edge pivoting rule are commonly used in linear programming codes they...
A simple idea used in many combinatorial algorithms is the idea of pivoting. Originally, it comes fr...
AbstractOur paper presents a new finite crisscross method for oriented matroids. Starting from a nei...
A simple idea used in many combinatorial algorithms is the idea of pivoting. Originally,...
The simplex method, created by George Dantzig, optimally solves a linear program by pivoting. Dantzi...
AbstractSpecially structured linear complementarity problems (LCPs) and their solution by the criss-...
Randomly-generated linear programming problems of three different types and five different sizes wer...