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A new criterion for the existence of an invariant distribution for Markov operators is presented. Moreover, it is also shown that the unique invariant distribution of an iterated function system is singular with respect to the Hausdorff measure.

Invariant measures for Markov operators with application to function systems

Tomasz Szarek (2003)

Studia Mathematica

A new sufficient condition for the existence of an invariant measure for Markov operators defined on Polish spaces is presented. This criterion is applied to iterated function systems.

Invariant measures for random dynamical systems [Book]

Katarzyna Horbacz (2008)

Invariant measures for semigroups

Ryotaro Sato (1975)

Studia Mathematica

Isometries on Irreducible Triangular Operator Algebras.

Alan Hopenwasser (1972)

Mathematica Scandinavica

Korovkin sets and mean ergodic theorems.

Nishishiraho, Toshihiko (1998)

Journal of Convex Analysis

Krengel-Lin decomposition for noncompact groups

Wojciech Bartoszek, Ryszard Rębowski (1996)

Colloquium Mathematicae

Le théorème de Riesz-Raikov-Bourgain pour un endomorphisme algébrique de $ℝ^{p}$

Jean-Claude Lootgieter (2007)

Annales de l’institut Fourier

Le théorème classique de Riesz-Raikov assure que, pour tout entier $θ > 1$ et toute $f$ de $L^{1} (𝕋)$ , où $𝕋 = ℝ / ℤ$ , les moyennes $\frac{1}{N} \sum_{1}^{N} f (θ^{n} x) convergent vers \int_{𝕋} f (t) d t$ pour presque tout point $x$ de $ℝ$ . J.Bourgain (cf.Israël Math. Conf. Proc. 1990) a prouvé que la convergence précédente a lieu pour tout réel algébrique $θ > 1$ et toute $f$ de $L^{2} (𝕋)$ . Dans cet article nous prouvons que, si $ϕ$ est un endomorphisme de $ℝ^{p}$ algébrique sur $ℚ$ , dont les valeurs propres sont toutes de module $> 1$ , alors pour toute $f$ de $L^{2} (𝕋^{p})$ , les moyennes $(1 / N) \sum_{1}^{N} f (ϕ^{n} x)$ convergent vers $\int_{𝕋^{p}} f (t) d t$ pour presque tout point $x$ de $ℝ^{p}$ . Nous...

Le théorème ergodique de Chacón-Ornstein

Paul-André Meyer (1964/1966)

Séminaire Bourbaki

Linear modulus of a multidimensional semigroup of $L_{1}$ -contractions and a differentiation theorem

Dogan Çömez (1989)

Colloquium Mathematicae

Local ergodic properties of $L_{p}$ -operator semigroups

Ryotaro Sato (1973)

Commentationes Mathematicae Universitatis Carolinae

Local ergodic theorems.

Teresa Bermúdez, Manuel González, Mostafa Mbekhta (1998)

Extracta Mathematicae

Majoration des semi-groupes de contractions de L1 et applications

Claude Kipnis (1974)

Annales de l'I.H.P. Probabilités et statistiques

Marcinkiewicz multipliers of higher variation and summability of operator-valued Fourier series

Earl Berkson (2014)

Studia Mathematica

Let $f \in V_{r} () \cup_{r} ()$ , where, for 1 ≤ r < ∞, $V_{r} ()$ (resp., $_{r} ()$ ) denotes the class of functions (resp., bounded functions) g: → ℂ such that g has bounded r-variation (resp., uniformly bounded r-variations) on (resp., on the dyadic arcs of ). In the author’s recent article [New York J. Math. 17 (2011)] it was shown that if is a super-reflexive space, and E(·): ℝ → () is the spectral decomposition of a trigonometrically well-bounded operator U ∈ (), then over a suitable non-void open interval of r-values, the condition...

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