A game on a convex geometry is a real-valued function defined on the family L of the closed sets of a closure operator which satisfies the finite Minkowski.
We will extend the work of Weber on probabilistic values to games on convex geometries. As a result, we obtain a family of axioms that give rise to several ...
I start with hitting probabilities for convex bodies, which can be treated by means of integral geometry. Then I want to explain how several clas- sical results ...
Missing: Probabilistic | Show results with:Probabilistic
Jun 4, 2022 · The method seems valid. But after careful consideration, nearly all pi pairs are interdependent, clearly limiting each other's result set.
A game on a convex geometry is a real-valued function defined on the family L of the closed sets of a closure operator which satisfies the finite ...
This thesis consists of three main topics in which we explore the geometry and other features of certain convex sets arising in probabilistic contexts.
A variety of inter-connected topics from probability, functional analysis, the theory of convex sets in Euclidean spaces, and statistics.
Missing: values | Show results with:values
The purpose of this article is an extension of Shapley's value for games with restricted cooperation. The classical model of cooperative game where every ...
Duration: 1:01:38
Posted: Jan 9, 2024
Posted: Jan 9, 2024
Two models are popular in representing uncertain data: tuple-level uncertainty model where each database tuple has an occurrence probability, and attribute- ...