AbstractWe use tools and methods from real algebraic geometry (spaces of ultrafilters, elimination of quantifiers) to formulate a theory of convexity in KN over an arbitrary ordered field. By defining certain ideal points (which can be viewed as generalizations of recession cones) we obtain a generalized notion of polar set. These satisfy a form of polar duality that applies to general convex sets and does not reduce to classical duality if K is the field of real numbers. As an application we give a partial classification of total orderings of Artinian local rings and two applications to ordinary convex geometry over the real numbers
Summary. This article describes a method to compute successive convex approxi-mations of the convex ...
AbstractIn the present paper we generalise transference theorems from the classical geometry of numb...
Abstract. The ordinary and common notions of polarity of convex sets are remarkable among notions of...
AbstractWe use tools and methods from real algebraic geometry (spaces of ultrafilters, elimination o...
This dissertation studies certain asymmetric (in the sense of not closed under complement) propertie...
The paper studies separation properties for subsets of the space (Formula presented.) of normlinear ...
Motivated by applications in financial mathematics, Ref. 3 showed that, although $$L^{0}(\mathbb{R}_...
Convex mappings from a locally convex space X into F<sup>.</sup> = F ∪ {+∞} are considered, where F ...
We show that the usual polarity properties of the face lattices of convex polytopes do not extend to...
textabstractThis paper attempts to extend the notion of duality for convex cones, by basing it on a ...
AbstractConvex mappings from a locally convex space X into F. = F ∪ {+∞} are considered, where F is ...
summary:In the paper, the notion of relative polarity in ordered sets is introduced and the lattices...
Using a result of Y. Brenier [Comm. Pure Appl. Math. 44 (1991) 375--417] we give a representation of...
A subset of a finite-dimensional real vector space is called evenly convex if it is the intersectio...
AbstractIn this paper, we prove a multidimensional extension of the so-called Bipolar Theorem proved...
Summary. This article describes a method to compute successive convex approxi-mations of the convex ...
AbstractIn the present paper we generalise transference theorems from the classical geometry of numb...
Abstract. The ordinary and common notions of polarity of convex sets are remarkable among notions of...
AbstractWe use tools and methods from real algebraic geometry (spaces of ultrafilters, elimination o...
This dissertation studies certain asymmetric (in the sense of not closed under complement) propertie...
The paper studies separation properties for subsets of the space (Formula presented.) of normlinear ...
Motivated by applications in financial mathematics, Ref. 3 showed that, although $$L^{0}(\mathbb{R}_...
Convex mappings from a locally convex space X into F<sup>.</sup> = F ∪ {+∞} are considered, where F ...
We show that the usual polarity properties of the face lattices of convex polytopes do not extend to...
textabstractThis paper attempts to extend the notion of duality for convex cones, by basing it on a ...
AbstractConvex mappings from a locally convex space X into F. = F ∪ {+∞} are considered, where F is ...
summary:In the paper, the notion of relative polarity in ordered sets is introduced and the lattices...
Using a result of Y. Brenier [Comm. Pure Appl. Math. 44 (1991) 375--417] we give a representation of...
A subset of a finite-dimensional real vector space is called evenly convex if it is the intersectio...
AbstractIn this paper, we prove a multidimensional extension of the so-called Bipolar Theorem proved...
Summary. This article describes a method to compute successive convex approxi-mations of the convex ...
AbstractIn the present paper we generalise transference theorems from the classical geometry of numb...
Abstract. The ordinary and common notions of polarity of convex sets are remarkable among notions of...