The possibility of representing the epigraph of a nite-valued convex function by means of a (locally) Farkas-Minkowski linear semi-innite inequalities system is studied in this paper. Moreover, we prove that the so-called locally polyhedral representations characterize the function, giving rise to the concept of quasipolyhedral function. Conditions for its conjugate to be also quasipolyhedral are obtained, as well as the characterization of its subdifferential and "subdifferential in terms of a specic sequence of ordinary polyhedral functions
This paper deals with linear systems containing finitely many weak and/or strict inequalities, whose...
AbstractThe notions of cyclic quasimonotonicity and cyclic pseudomonotonicity are introduced. A clas...
AbstractThis paper provides an extension to linear semiinfinite systems of a well-known property of ...
AbstractLinear systems of an arbitrary number of inequalities provide external representations for t...
The objective of this paper is to analyse under what well-known operations the class of qua-sipolyhe...
AbstractThe concepts of M-convex and L-convex functions were proposed by Murota in 1996 as two mutua...
AbstractThe solution sets of analytical linear inequality systems posed in the Euclidean space form ...
We introduce the set of quasi-Herglotz functions and demonstrate that it has properties useful in th...
In this paper, we show that for a polyhedral multifunction F : R n ! R m with convex range, the ...
Convex polyhedra are important objects in various areas of mathematics and other disciplines. A fund...
This book offers a review of the theory of locally convex quasi *-algebras, authored by two of its c...
In this paper we characterize the convexity and the natural quasiconvexity of locallyLipschitz vecto...
Abstract Necessary and sufficient conditions are given for an in-equality vz equality involved in a ...
Abstract It is shown that a locally Lipschitz function is approximately convex if, and only if, its ...
textabstractIn the first chapter of this book the basic results within convex and quasiconvex analys...
This paper deals with linear systems containing finitely many weak and/or strict inequalities, whose...
AbstractThe notions of cyclic quasimonotonicity and cyclic pseudomonotonicity are introduced. A clas...
AbstractThis paper provides an extension to linear semiinfinite systems of a well-known property of ...
AbstractLinear systems of an arbitrary number of inequalities provide external representations for t...
The objective of this paper is to analyse under what well-known operations the class of qua-sipolyhe...
AbstractThe concepts of M-convex and L-convex functions were proposed by Murota in 1996 as two mutua...
AbstractThe solution sets of analytical linear inequality systems posed in the Euclidean space form ...
We introduce the set of quasi-Herglotz functions and demonstrate that it has properties useful in th...
In this paper, we show that for a polyhedral multifunction F : R n ! R m with convex range, the ...
Convex polyhedra are important objects in various areas of mathematics and other disciplines. A fund...
This book offers a review of the theory of locally convex quasi *-algebras, authored by two of its c...
In this paper we characterize the convexity and the natural quasiconvexity of locallyLipschitz vecto...
Abstract Necessary and sufficient conditions are given for an in-equality vz equality involved in a ...
Abstract It is shown that a locally Lipschitz function is approximately convex if, and only if, its ...
textabstractIn the first chapter of this book the basic results within convex and quasiconvex analys...
This paper deals with linear systems containing finitely many weak and/or strict inequalities, whose...
AbstractThe notions of cyclic quasimonotonicity and cyclic pseudomonotonicity are introduced. A clas...
AbstractThis paper provides an extension to linear semiinfinite systems of a well-known property of ...