In this paper, we prove a multidimensional extension of the so-called Bipolar Theorem proved in Brannath and Schachermayer (Séminaire de Probabilités, vol. XXX, 1999, p. 349), which says that the bipolar of a convex set of positive random variables is equal to its closed, solid convex hull. This result may be seen as an extension of the classical statement that the bipolar of a subset in a locally convex vector space equals its convex hull. The proof in Brannath and Schachermayer (ibidem) is strongly dependent on the order properties of Image . Here, we define a (partial) order structure with respect to a d-dimensional convex cone K of the positive orthant [0,∞)d. We may then use compactness properties to work with the first component and o...
In this article, we define the conditional convex order, that is, a stochastic ordering between rand...
This dissertation studies certain asymmetric (in the sense of not closed under complement) propertie...
AbstractMotivated by financial applications, we study convex analysis for modules over the ordered r...
AbstractIn this paper, we prove a multidimensional extension of the so-called Bipolar Theorem proved...
Motivated by applications in financial mathematics, Ref. 3 showed that, although $$L^{0}(\mathbb{R}_...
AbstractSeveral basic results of convexity theory are generalized to the “quantized” matrix convex s...
In this paper we show a property of convex sets with an application to chacacterize inequalities for...
We introduce the concepts of max-closedness and numéraires of convex subsets of L+0, the nonnegative...
AbstractThe problem of establishing inequalities of the Hermite–Hadamard type for convex functions o...
Summary2 (or a wish-list, subject to reality test) 1. Recalling fundamental notions and results from...
The notion of convex set for subsets of lattices in one particular case was introduced in [1], where...
AbstractWe use tools and methods from real algebraic geometry (spaces of ultrafilters, elimination o...
This report constitutes the Doctoral Dissertation for Munevver Mine Subasi and consists of three top...
The concept of convexlike (concavelike) functions was introduced by Ky Fan (1953), who has proved th...
We define two non-linear operations with random (not necessarily closed) sets in Banach space: the c...
In this article, we define the conditional convex order, that is, a stochastic ordering between rand...
This dissertation studies certain asymmetric (in the sense of not closed under complement) propertie...
AbstractMotivated by financial applications, we study convex analysis for modules over the ordered r...
AbstractIn this paper, we prove a multidimensional extension of the so-called Bipolar Theorem proved...
Motivated by applications in financial mathematics, Ref. 3 showed that, although $$L^{0}(\mathbb{R}_...
AbstractSeveral basic results of convexity theory are generalized to the “quantized” matrix convex s...
In this paper we show a property of convex sets with an application to chacacterize inequalities for...
We introduce the concepts of max-closedness and numéraires of convex subsets of L+0, the nonnegative...
AbstractThe problem of establishing inequalities of the Hermite–Hadamard type for convex functions o...
Summary2 (or a wish-list, subject to reality test) 1. Recalling fundamental notions and results from...
The notion of convex set for subsets of lattices in one particular case was introduced in [1], where...
AbstractWe use tools and methods from real algebraic geometry (spaces of ultrafilters, elimination o...
This report constitutes the Doctoral Dissertation for Munevver Mine Subasi and consists of three top...
The concept of convexlike (concavelike) functions was introduced by Ky Fan (1953), who has proved th...
We define two non-linear operations with random (not necessarily closed) sets in Banach space: the c...
In this article, we define the conditional convex order, that is, a stochastic ordering between rand...
This dissertation studies certain asymmetric (in the sense of not closed under complement) propertie...
AbstractMotivated by financial applications, we study convex analysis for modules over the ordered r...