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Displaying 101 – 120 of 148

Prodistributions

Paul Krée (1974/1975)

Séminaire Paul Krée

Product $ℤ^{d}$ -actions on a Lebesgue space and their applications

I. Filipowicz (1997)

Studia Mathematica

We define a class of $ℤ^{d}$ -actions, d ≥ 2, called product $ℤ^{d}$ -actions. For every such action we find a connection between its spectrum and the spectra of automorphisms generating this action. We prove that for any subset A of the positive integers such that 1 ∈ A there exists a weakly mixing $ℤ^{d}$ -action, d≥2, having A as the set of essential values of its multiplicity function. We also apply this class to construct an ergodic $ℤ^{d}$ -action with Lebesgue component of multiplicity $2^{d} k$ , where k is an arbitrary positive...

Product decomposition of a $s i g m a$ -ring

Jozef Dravecký (1985)

Mathematica Slovaca

Product decomposition of idempotent measures on compact semigroups

Štefan Schwarz (1964)

Czechoslovak Mathematical Journal

Product integral in a Fréchet algebra.

Wiciak, Margareta (2001)

Zeszyty Naukowe Uniwersytetu Jagiellońskiego. Universitatis Iagellonicae Acta Mathematica

Product integration. Its history and applications [Book]

Slavík, Antonín (2007)

Product liftings and densities with lifting invariant and density invariant sections

Kazimierz Musiał, W. Strauss, N. Macheras (2000)

Fundamenta Mathematicae

Given two measure spaces equipped with liftings or densities (complete if liftings are considered) the existence of product liftings and densities with lifting invariant or density invariant sections is investigated. It is proved that if one of the marginal liftings is admissibly generated (a subclass of consistent liftings), then one can always find a product lifting which has the property that all sections determined by one of the marginal spaces are lifting invariant (Theorem 2.13). For a large...

Product measurability and Scorza-Dragoni's type property

Wojciech Zygmunt (1988)

Rendiconti del Seminario Matematico della Università di Padova

Product of dominated vector measures

Miloslav Duchoň (1977)

Mathematica Slovaca

Product of vector measures on topological spaces

Surjit Singh Khurana (2008)

Commentationes Mathematicae Universitatis Carolinae

For $i = (1, 2)$ , let $X_{i}$ be completely regular Hausdorff spaces, $E_{i}$ quasi-complete locally convex spaces, $E = E_{1} \overset{˘}{\otimes} E_{2}$ , the completion of the their injective tensor product, $C_{b} (X_{i})$ the spaces of all bounded, scalar-valued continuous functions on $X_{i}$ , and $μ_{i}$ $E_{i}$ -valued Baire measures on $X_{i}$ . Under certain...

Product Pre-Measure

Noboru Endou (2016)

Formalized Mathematics

In this article we formalize in Mizar [5] product pre-measure on product sets of measurable sets. Although there are some approaches to construct product measure [22], [6], [9], [21], [25], we start it from σ-measure because existence of σ-measure on any semialgebras has been proved in [15]. In this approach, we use some theorems for integrals.

Product rule and chain rule estimates for the Hajłasz gradient on doubling metric measure spaces

A. Eduardo Gatto, Carlos Segovia (2006)

Colloquium Mathematicae

We use the Calderón Maximal Function to prove the Kato-Ponce Product Rule Estimate and the Christ-Weinstein Chain Rule Estimate for the Hajłasz gradient on doubling measure metric spaces.

Products and convolutions of vector valued set functions

James Huneycutt (1972)

Studia Mathematica

Products of completion regular measures

David Fremlin, S. Grekas (1995)

Fundamenta Mathematicae

We investigate the products of topological measure spaces, discussing conditions under which all open sets will be measurable for the simple completed product measure, and under which the product of completion regular measures will be completion regular. In passing, we describe a new class of spaces on which all completion regular Borel probability measures are τ-additive, and which have other interesting properties.

Products of group-valued measures

H. Millington (1975)

Studia Mathematica

Products of ideals of Borel sets

Gavalec, Martin (1981)

Abstracta. 9th Winter School on Abstract Analysis

Products of non- $σ$ -lower porous sets

Martin Rmoutil (2013)

Czechoslovak Mathematical Journal

In the present article we provide an example of two closed non- $σ$ -lower porous sets $A, B \subseteq ℝ$ such that the product $A \times B$ is lower porous. On the other hand, we prove the following: Let $X$ and $Y$ be topologically complete metric spaces, let $A \subseteq X$ be a non- $σ$ -lower porous Suslin set and let $B \subseteq Y$ be a non- $σ$ -porous Suslin set. Then the product $A \times B$ is non- $σ$ -lower porous. We also provide a brief summary of some basic properties of lower porosity, including a simple characterization of Suslin non- $σ$ -lower porous sets in topologically...

Currently displaying 101 – 120 of 148

Previous Page 6 Next

Displaying 101 – 120 of 148

Prodistributions

Product $ℤ^{d}$ -actions on a Lebesgue space and their applications

Product decomposition of a $s i g m a$ -ring

Product decomposition of idempotent measures on compact semigroups

Product integral in a Fréchet algebra.

Product integration. Its history and applications [Book]

Product liftings and densities with lifting invariant and density invariant sections

Product measurability and Scorza-Dragoni's type property

Product of dominated vector measures

Product of vector measures on topological spaces

Product Pre-Measure

Product rule and chain rule estimates for the Hajłasz gradient on doubling metric measure spaces

Products and convolutions of vector valued set functions

Products of completion regular measures

Products of group-valued measures

Products of ideals of Borel sets

Products of non- $σ$ -lower porous sets

Products of Vector Measures

Products of vector measures by means of Fubini's theorem

Produit topologique, produit tensoriel et $c$ -replétion

Currently displaying 101 – 120 of 148