AbstractIn 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 R. 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 an...
This report constitutes the Doctoral Dissertation for Munevver Mine Subasi and consists of three top...
Summary2 (or a wish-list, subject to reality test) 1. Recalling fundamental notions and results from...
AbstractThis note, through discussing convexification of functions on any sets, extends Stegall's ma...
AbstractIn this paper, we prove a multidimensional extension of the so-called Bipolar Theorem proved...
In this paper, we prove a multidimensional extension of the so-called Bipolar Theorem proved in Bran...
Motivated by applications in financial mathematics, Ref. 3 showed that, although $$L^{0}(\mathbb{R}_...
AbstractSeveral basic results of convexity theory are generalized to the “quantized” matrix convex s...
It is well-known that there is an intimate connection between the Radon-Nikodym property and marting...
We introduce the concepts of max-closedness and numéraires of convex subsets of L+0, the nonnegative...
AbstractMotivated by financial applications, we study convex analysis for modules over the ordered r...
We define two non-linear operations with random (not necessarily closed) sets in Banach space: the c...
AbstractWe use tools and methods from real algebraic geometry (spaces of ultrafilters, elimination o...
We provide conditions under which an incomplete strongly independent preorder on a convex set X can ...
On a Boolean algebra we consider the topology $u$ induced by a finitely additive measure $\mu$ with ...
AbstractB-convexity was introduced in [W. Briec, C. Horvath, B-convexity, Optimization 53 (2004) 103...
This report constitutes the Doctoral Dissertation for Munevver Mine Subasi and consists of three top...
Summary2 (or a wish-list, subject to reality test) 1. Recalling fundamental notions and results from...
AbstractThis note, through discussing convexification of functions on any sets, extends Stegall's ma...
AbstractIn this paper, we prove a multidimensional extension of the so-called Bipolar Theorem proved...
In this paper, we prove a multidimensional extension of the so-called Bipolar Theorem proved in Bran...
Motivated by applications in financial mathematics, Ref. 3 showed that, although $$L^{0}(\mathbb{R}_...
AbstractSeveral basic results of convexity theory are generalized to the “quantized” matrix convex s...
It is well-known that there is an intimate connection between the Radon-Nikodym property and marting...
We introduce the concepts of max-closedness and numéraires of convex subsets of L+0, the nonnegative...
AbstractMotivated by financial applications, we study convex analysis for modules over the ordered r...
We define two non-linear operations with random (not necessarily closed) sets in Banach space: the c...
AbstractWe use tools and methods from real algebraic geometry (spaces of ultrafilters, elimination o...
We provide conditions under which an incomplete strongly independent preorder on a convex set X can ...
On a Boolean algebra we consider the topology $u$ induced by a finitely additive measure $\mu$ with ...
AbstractB-convexity was introduced in [W. Briec, C. Horvath, B-convexity, Optimization 53 (2004) 103...
This report constitutes the Doctoral Dissertation for Munevver Mine Subasi and consists of three top...
Summary2 (or a wish-list, subject to reality test) 1. Recalling fundamental notions and results from...
AbstractThis note, through discussing convexification of functions on any sets, extends Stegall's ma...