Convergence uniforme à distance finie de mesures signées
Convergence with respect to -supported ideals
Convergent regular measures on MV–algebras
We obtain for measures on MV-algebras the classical theorem of Dieudonné related to convergent sequences of regular maps.
Convex Corson compacta and Radon measures
Assuming the continuum hypothesis, we show that (i) there is a compact convex subset L of , and a probability Radon measure on L which has no separable support; (ii) there is a Corson compact space K, and a convex weak*-compact set M of Radon probability measures on K which has no -points.
Convolution and S' - Convolution of Distributions
Convolution de mesures portées par une surface convexe
Convolution semigroup of measures on compact noncommutative semigroups
Convolutions and products of partially ordered vector-valued positive measures.
Convolutions related to q-deformed commutativity
Two important examples of q-deformed commutativity relations are: aa* - qa*a = 1, studied in particular by M. Bożejko and R. Speicher, and ab = qba, studied by T. H. Koornwinder and S. Majid. The second case includes the q-normality of operators, defined by S. Ôta (aa* = qa*a). These two frameworks give rise to different convolutions. In particular, in the second scheme, G. Carnovale and T. H. Koornwinder studied their q-convolution. In the present paper we consider another convolution of measures...
Convolutions with the continuous primitive integral.
Coordinate -dimension prints.
Coordinatewise decomposition, Borel cohomology, and invariant measures
Given Polish spaces X and Y and a Borel set S ⊆ X × Y with countable sections, we describe the circumstances under which a Borel function f: S → ℝ is of the form f(x,y) = u(x) + v(y), where u: X → ℝ and v: Y → ℝ are Borel. This turns out to be a special case of the problem of determining whether a real-valued Borel cocycle on a countable Borel equivalence relation is a coboundary. We use several Glimm-Effros style dichotomies to give a solution to this problem in terms of certain σ-finite measures...
Coordinatewise decomposition of group-valued Borel functions
Answering a question of Kłopotowski, Nadkarni, Sarbadhikari, and Srivastava, we characterize the Borel sets S ⊆ X × Y with the property that every Borel function f: S → ℂ is of the form f(x,y) = u(x) + v(y), where u: X → ℂ and v: Y → ℂ are Borel.
Copies of in the space of Pettis integrable functions with integrals of finite variation
Let (Ω,Σ,μ) be a complete finite measure space and X a Banach space. We show that the space of all weakly μ-measurable (classes of scalarly equivalent) X-valued Pettis integrable functions with integrals of finite variation, equipped with the variation norm, contains a copy of if and only if X does.
Correction on “The properties of the Aumann integral with applications to differential inclusions and control systems”
Correction to A Geometrie Characterization of Non-Atomic Measure Spaces.
Correction to An algebraic formulation of ergodic problems
Correction to: Integrating bounded functions for the Dobrakov integral
Correction to “On the non-measurability of a certain mapping”
Correction to : “Precompact contraction of metric uniformities and the continuity of ”