We construct the duality for special probability spaces using the Gale duality.</p
ABSTRACT. We determine the probability that a random k-dimensional subspace ofRn contains a positive...
For a given random graph, a connected component that contains a finite fraction of the entire graph'...
Utilising and expanding concepts from categorical topology and algebra, we contrive a moderately gen...
summary:Some characterizations of random approximations are obtained in a locally convex space throu...
Abstract. Some characterizations of random approximations are obtained in a locally convex space thr...
The classical random graph model $G(n,\lambda/n)$ satisfies a `duality principle', in that removing ...
Random polytopes can be constructed in many different ways. In this thesis two certain kinds are con...
We consider three different approaches to define natural Riemannian metrics on polytopes of stochast...
AbstractBy a symmetric interval partition we mean a perfect, closed random set Ξ in [0,1] of Lebesgu...
A new duality theory is developed for a class of stochastic programs in which the probability distri...
This thesis presents new applications of Gale duality to the study of polytopes with extremal combin...
We consider three different approaches to define natural Riemannian metrics on polytopes of stochast...
We have been working on the formalization of the probability and the randomness. In [15] and [16], w...
Abstract. We present a duality relation between two systems of coalescing random walks and an analog...
Some duality problems in expected utility theory, raised by the introduction of non—additive probabi...
ABSTRACT. We determine the probability that a random k-dimensional subspace ofRn contains a positive...
For a given random graph, a connected component that contains a finite fraction of the entire graph'...
Utilising and expanding concepts from categorical topology and algebra, we contrive a moderately gen...
summary:Some characterizations of random approximations are obtained in a locally convex space throu...
Abstract. Some characterizations of random approximations are obtained in a locally convex space thr...
The classical random graph model $G(n,\lambda/n)$ satisfies a `duality principle', in that removing ...
Random polytopes can be constructed in many different ways. In this thesis two certain kinds are con...
We consider three different approaches to define natural Riemannian metrics on polytopes of stochast...
AbstractBy a symmetric interval partition we mean a perfect, closed random set Ξ in [0,1] of Lebesgu...
A new duality theory is developed for a class of stochastic programs in which the probability distri...
This thesis presents new applications of Gale duality to the study of polytopes with extremal combin...
We consider three different approaches to define natural Riemannian metrics on polytopes of stochast...
We have been working on the formalization of the probability and the randomness. In [15] and [16], w...
Abstract. We present a duality relation between two systems of coalescing random walks and an analog...
Some duality problems in expected utility theory, raised by the introduction of non—additive probabi...
ABSTRACT. We determine the probability that a random k-dimensional subspace ofRn contains a positive...
For a given random graph, a connected component that contains a finite fraction of the entire graph'...
Utilising and expanding concepts from categorical topology and algebra, we contrive a moderately gen...