Add to ORKGInternational audienceWe study measures on R(n) which are product measures for the usual Cartesian product structure of R(n) as well as for the polar decomposition of R(n) induced by a convex body. For finite atomic measures and for absolutely continuous measures with density dmu/dx = e(-V(x)) where V is locally integrable, a complete characterization is presented
Conditions are given under which a product of two semifinite measures is absolutely continuous or we...
abstract.- This paper proves some results concerning the polar factorisation of an integrable vector...
We characterise equality cases in matrix H¨older’s inequality and develop a divergence formulation o...
A scaling on some space is a measurable action of the group of positive real numbers. A measure on a...
We study the link between two different factorization theorems and their proofs : Brenier's Theorem...
For a given element f∈L1 and a convex cone C⊂L∞, C∩L∞+={0}, we give necessary and sufficient conditi...
The differential properties of the Radon measures on the local-convex spaces are studied. Several af...
Given a probability space ( X, p) and a bounded domain R in R d equipped with the Lebesgue measure...
Let X be an open set inRd, d ≥ 2, such that Xc is non-polar, if d = 2, and let x ∈ X. In [2] it is s...
We characterize the sets X of all products P Q, and Y of all products P QP, where P, Q run over all ...
Blaschke-Petkantschin formula is a geometric measure decomposition of the q-fold product of Lebesgue...
The goal of this work is to reach the comprehension of the proof of a remarkable result: Brenier's ...
Using a result of Y. Brenier [Comm. Pure Appl. Math. 44 (1991) 375--417] we give a representation of...
This work is devoted to the investigation of the basic relationship between the geometric shape of a...
We prove that every closed exhaustive vector-valued modular measure on a lattice ordered effect alge...
Conditions are given under which a product of two semifinite measures is absolutely continuous or we...
abstract.- This paper proves some results concerning the polar factorisation of an integrable vector...
We characterise equality cases in matrix H¨older’s inequality and develop a divergence formulation o...
A scaling on some space is a measurable action of the group of positive real numbers. A measure on a...
We study the link between two different factorization theorems and their proofs : Brenier's Theorem...
For a given element f∈L1 and a convex cone C⊂L∞, C∩L∞+={0}, we give necessary and sufficient conditi...
The differential properties of the Radon measures on the local-convex spaces are studied. Several af...
Given a probability space ( X, p) and a bounded domain R in R d equipped with the Lebesgue measure...
Let X be an open set inRd, d ≥ 2, such that Xc is non-polar, if d = 2, and let x ∈ X. In [2] it is s...
We characterize the sets X of all products P Q, and Y of all products P QP, where P, Q run over all ...
Blaschke-Petkantschin formula is a geometric measure decomposition of the q-fold product of Lebesgue...
The goal of this work is to reach the comprehension of the proof of a remarkable result: Brenier's ...
Using a result of Y. Brenier [Comm. Pure Appl. Math. 44 (1991) 375--417] we give a representation of...
This work is devoted to the investigation of the basic relationship between the geometric shape of a...
We prove that every closed exhaustive vector-valued modular measure on a lattice ordered effect alge...
Conditions are given under which a product of two semifinite measures is absolutely continuous or we...
abstract.- This paper proves some results concerning the polar factorisation of an integrable vector...
We characterise equality cases in matrix H¨older’s inequality and develop a divergence formulation o...