A bimonotone linear inequality is a linear inequality with at most two nonzero coefficients that are of opposite signs (if both different from zero). A linear inequality defines a halfspace that is a sublattice of Rn (a subset closed with respect to componentwise maximum and minimum) if and only if it is bimonotone. Veinott has shown that a polyhedron is a sublattice if and only if it can be defined by a finite system of bimonotone linear inequalities, whereas Topkis has shown that every sublattice of Rn (and of more general product lattices) is the solution set of a system of nonlinear bimonotone inequalities. In this paper we prove that a subset of Rn is the solution set of a countable system of bimonotone linear inequalities if and only ...
The Carathéodory, Helly, and Radon numbers are three main invariants in convexity theory. These inva...
Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relat...
The convex subsemilattices of a semilattice E form a lattice Co(E) in the natural way. The purpose o...
AbstractA bimonotone linear inequality is a linear inequality with at most two nonzero coefficients ...
AbstractIt is shown that each element of the lattice of meet (resp., join) sublattices of a product ...
AbstractThe Cartesian product of lattices is a lattice, called a product space, with componentwise m...
The Carathéodory, Helly, and Radon numbers are three main invariants in convexity theory. They relat...
Abstract. The collection CL(T) of nonempty convex sublattices of a lat-tice T ordered by bi-dominati...
A system of linear inequality and equality constraints determines a convex polyhedral set of feasibl...
Given a quasi-concave-convex function f: X × Y → R defined on the product of two convex sets we woul...
Abstract Necessary and sufficient conditions are given for an in-equality vz equality involved in a ...
Sublinear circuits are generalizations of the affine circuits in matroid theory, and they arise as t...
20 pagesInternational audienceThe collection $\mathcal{C}_{L}(T)$ of nonempty convex sublattices of ...
AbstractThe solution sets of analytical linear inequality systems posed in the Euclidean space form ...
AbstractLinear systems of an arbitrary number of inequalities provide external representations for t...
The Carathéodory, Helly, and Radon numbers are three main invariants in convexity theory. These inva...
Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relat...
The convex subsemilattices of a semilattice E form a lattice Co(E) in the natural way. The purpose o...
AbstractA bimonotone linear inequality is a linear inequality with at most two nonzero coefficients ...
AbstractIt is shown that each element of the lattice of meet (resp., join) sublattices of a product ...
AbstractThe Cartesian product of lattices is a lattice, called a product space, with componentwise m...
The Carathéodory, Helly, and Radon numbers are three main invariants in convexity theory. They relat...
Abstract. The collection CL(T) of nonempty convex sublattices of a lat-tice T ordered by bi-dominati...
A system of linear inequality and equality constraints determines a convex polyhedral set of feasibl...
Given a quasi-concave-convex function f: X × Y → R defined on the product of two convex sets we woul...
Abstract Necessary and sufficient conditions are given for an in-equality vz equality involved in a ...
Sublinear circuits are generalizations of the affine circuits in matroid theory, and they arise as t...
20 pagesInternational audienceThe collection $\mathcal{C}_{L}(T)$ of nonempty convex sublattices of ...
AbstractThe solution sets of analytical linear inequality systems posed in the Euclidean space form ...
AbstractLinear systems of an arbitrary number of inequalities provide external representations for t...
The Carathéodory, Helly, and Radon numbers are three main invariants in convexity theory. These inva...
Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relat...
The convex subsemilattices of a semilattice E form a lattice Co(E) in the natural way. The purpose o...