Farkas’ lemma is a celebrated result on the solutions of systems of linear inequalities, which finds application pervasively in mathematics and computer science. In this work we show how to formulate and prove Farkas’ lemma in diagrammatic polyhedral algebra, a sound and complete graphical calculus for polyhedra. Furthermore, we show how linear programs can be modeled within the calculus and how some famous duality results can be proved
Farkas' lemma is a fundamental result from linear programming providing linear certificates for infe...
AbstractThis paper develops new duality relations in linear programming which give new economic inte...
In this paper we investigate the class NP ∩ co-NP (or the class of problems permitting a good charac...
Farkas’ lemma is a celebrated result on the solutions of systems of linear inequalities, which finds...
Farkas\u27 lemma is a celebrated result on the solutions of systems of linear inequalities, which fi...
ABSTRACT: We study a problem of linear programming in the setting of a vector space over a linearly ...
This book presents an elementary introduction to the theory of oriented matroids. The way oriented m...
In linear programming it is known that an appropriate non-homogeneous Farkas Lemma leads to a short ...
Orientador: Sandra Augusta SantosDissertação (mestrado profissional) - Universidade Estadual de Camp...
summary:In this paper we investigate a class of problems permitting a good characterisation from the...
AbstractLinear programming is formulated with the vector variable replaced by a matrix variable, wit...
The main purpose of this paper is to extend the John theorem on nonlinear programming with inequalit...
We present a formalization of convex polyhedra in the proof assistant Coq. The cornerstone of our wo...
AbstractGiven A∈Zm×n and b∈Zm, we consider the issue of existence of a solution x∈Nn to the system o...
AbstractA method is described for obtaining the facets of certain convex polyhedra from the optimal ...
Farkas' lemma is a fundamental result from linear programming providing linear certificates for infe...
AbstractThis paper develops new duality relations in linear programming which give new economic inte...
In this paper we investigate the class NP ∩ co-NP (or the class of problems permitting a good charac...
Farkas’ lemma is a celebrated result on the solutions of systems of linear inequalities, which finds...
Farkas\u27 lemma is a celebrated result on the solutions of systems of linear inequalities, which fi...
ABSTRACT: We study a problem of linear programming in the setting of a vector space over a linearly ...
This book presents an elementary introduction to the theory of oriented matroids. The way oriented m...
In linear programming it is known that an appropriate non-homogeneous Farkas Lemma leads to a short ...
Orientador: Sandra Augusta SantosDissertação (mestrado profissional) - Universidade Estadual de Camp...
summary:In this paper we investigate a class of problems permitting a good characterisation from the...
AbstractLinear programming is formulated with the vector variable replaced by a matrix variable, wit...
The main purpose of this paper is to extend the John theorem on nonlinear programming with inequalit...
We present a formalization of convex polyhedra in the proof assistant Coq. The cornerstone of our wo...
AbstractGiven A∈Zm×n and b∈Zm, we consider the issue of existence of a solution x∈Nn to the system o...
AbstractA method is described for obtaining the facets of certain convex polyhedra from the optimal ...
Farkas' lemma is a fundamental result from linear programming providing linear certificates for infe...
AbstractThis paper develops new duality relations in linear programming which give new economic inte...
In this paper we investigate the class NP ∩ co-NP (or the class of problems permitting a good charac...