Caractérisation d’une classe d’ensembles convexes de ou
Caractérisation d'une solution optimale au problème de Monge-Kantorovitch
Caracterización geométrica de la independencia en un espacio gaussiano.
Charges, poids et mesures de Lévy dans les espaces vectoriels localement convexes
Compact convex sets of the plane and probability theory
The Gauss−Minkowski correspondence in ℝ2 states the existence of a homeomorphism between the probability measures μ on [0,2π] such that ∫ 0 2 π e ix d μ ( x ) = 0 and the compact convex sets (CCS) of the plane with perimeter 1. In this article, we bring out explicit formulas relating the border of a CCS to its probability measure. As a consequence, we show that some natural operations on CCS – for example, the Minkowski sum – have natural translations in terms of probability measure operations,...
Compactness and Domination.
Compactness in spaces of uniform measures (Preliminary communication)
Comparability of Borel probability measures on euclidean line
Comparaison des expériences
Complément à la bibliographie de l'article de A. Tortrat : «τ-régularité des lois, séparation au sens de A. Tulcea et propriété de Radon-Nicodym»
Complément sur «le support des lois indéfiniment divisibles»
Compléments aux exposés sur les ensembles analytiques et les temps d'arrêt
Completion Regular Measures on Product Spaces.
Conjugate transforms and limit theorems for semigroups
Construction of Majorizing Measures, Bernoulli Processes and Cotype.
Convergence of compound probability measures on topological spaces
Convergence of weighted sums of independent random variables and an extension to Banach space-valued random variables.
Convolution de mesures portées par une surface convexe
Convolutions of probability measures on semigroups.
Correction Note to the Paper: On a Functional Equation Related to Families of Exponential Probability Measures