Add to ORKGInternational audienceWe develop a tropical analogue of the classical double description method allowing one to compute an internal representation (in terms of vertices) of a polyhedron defined externally (by inequalities). The heart of the tropical algorithm is a characterization of the extreme points of a polyhedron in terms of a system of constraints which define it. We show that checking the extremality of a point reduces to checking whether there is only one minimal strongly connected component in an hypergraph. The latter problem can be solved in almost linear time, which allows us to eliminate quickly redundant generators. We report extensive tests (including benchmarks from an application to static analysis) showing that the method ...
Tropical algebra, which can be considered as a relatively new field in Mathematics, emerged in sever...
Also arXiv:1308.2122International audienceWe introduce a generalization of tropical polyhedra able t...
In recent decades, tropical mathematics gradually evolved as a field of study in mathematics and it ...
International audienceWe develop a tropical analogue of the classical double description method allo...
We develop a tropical analogue of the classical double description method allowing one to compute an...
International audienceWe establish a characterization of the vertices of a tropical polyhedron defin...
In this thesis, we define a static analysis by abstract interpretation of memory manipulations. It i...
AbstractThe celebrated upper bound theorem of McMullen determines the maximal number of extreme poin...
AbstractWe discuss the tropical analogues of several basic questions of convex duality. In particula...
This paper is about the combinatorics of finite point configurations in the tropical projective spac...
We introduce a novel intrinsic volume concept in tropical geometry. This is achieved by developing t...
We introduce a generalization of tropical polyhedra able to express both strict and non-strict inequ...
Tropical geometry is an emerging field with strong connections in a wide array of areas both inside ...
Tropical polyhedra are known to be representable externally, as intersections of finitely many tropi...
Tropical algebra, which can be considered as a relatively new field in Mathematics, emerged in sever...
Also arXiv:1308.2122International audienceWe introduce a generalization of tropical polyhedra able t...
In recent decades, tropical mathematics gradually evolved as a field of study in mathematics and it ...
International audienceWe develop a tropical analogue of the classical double description method allo...
We develop a tropical analogue of the classical double description method allowing one to compute an...
International audienceWe establish a characterization of the vertices of a tropical polyhedron defin...
In this thesis, we define a static analysis by abstract interpretation of memory manipulations. It i...
AbstractThe celebrated upper bound theorem of McMullen determines the maximal number of extreme poin...
AbstractWe discuss the tropical analogues of several basic questions of convex duality. In particula...
This paper is about the combinatorics of finite point configurations in the tropical projective spac...
We introduce a novel intrinsic volume concept in tropical geometry. This is achieved by developing t...
We introduce a generalization of tropical polyhedra able to express both strict and non-strict inequ...
Tropical geometry is an emerging field with strong connections in a wide array of areas both inside ...
Tropical polyhedra are known to be representable externally, as intersections of finitely many tropi...
Tropical algebra, which can be considered as a relatively new field in Mathematics, emerged in sever...
Also arXiv:1308.2122International audienceWe introduce a generalization of tropical polyhedra able t...
In recent decades, tropical mathematics gradually evolved as a field of study in mathematics and it ...