Almost everywhere convergence II : proceedings of the International Conference on Almost Everywhere Convergence in Probability and Ergodic Theory, Evanston, Illinois, October 16-20, 1989 /

Almost Everywhere Convergence II.

Detalles Bibliográficos
Clasificación:Libro Electrónico
Autor Corporativo: International Conference on Almost Everywhere Convergence in Probability and Ergodic Theory Evanston, Ill.
Otros Autores: Bellow, A. (Alexandra), 1935-, Jones, Roger L.
Formato: Electrónico Congresos, conferencias eBook
Idioma:Inglés
Publicado: Boston : Academic Press, �1991.
Temas:
Convergence > Congresses.
Inequalities (Mathematics) > Congresses.
Probabilities > Congresses.
Ergodic theory > Congresses.
Convergence (Math�ematiques) > Congr�es.
In�egalit�es (Math�ematiques) > Congr�es.
Probabilit�es > Congr�es.
Th�eorie ergodique > Congr�es.
Convergence.
Ergodic theory.
Inequalities (Mathematics)
Probabilities.
Probabilities
Congress
Conference papers and proceedings.
Actes de congr�es.
Acceso en línea:Texto completo
Tabla de Contenidos:
  • Front Cover; Almost Everywhere Convergence II; Copyright Page; Table of Contents; CONTRIBUTORS; CONFERENCE PARTICIPANTS; Dedication; Preface; Chapter 1. A Solution to a Problem of A. Bellow; References; Chapter 2. Universal Weights from Dynamical Systems To Mean-Bounded Positive Operators on Lp; Introduction; Definition; References; Chapter 3. SOME CONNECTIONS BETWEEN ERGODIC THEORY AND HARMONIC ANALYSIS; 1. Introduction; 2. Equivalences and implications among several maximal estimates; 3. More maximal operators, weak (1, 1), Wiener-Wintner, and spectral continuity; REFERENCES
  • Chapter 4. On Hopfs Ergodic Theorem for Particles with Different VelocitiesSummary; 1. Hopfs Billiard; 2. A Counterexample; 3. The Local Ergodic Theorem; References; Chapter 5. A Note on the Strong Law of Large Numbers for Partial Sums of Independent Random Vectors; 1. Introduction and Preparatory Results; 2. Stability Results for Vector Valued Random Variables; 3. Possible Extensions; 4. Proof of Theorem 2.1; References; Chapter 6. SUMMABILITY METHODS AND ALMOST-SURE CONVERGENCE; 0. Introduction; 1. Limits of occupation times; 2. Cesaro and Riesz means; 3. Euler, Borel and related methods
  • Chapter 10. Mean Ergodicity of L1 Contractions and Pointwise Ergodic Theorems0 Introduction; 1 On Ergodic Convergence for a General L1 Contraction; 2 Ergodic Convergence of Commuting L1 Contractions; References; Chapter 11. Multi-Parameter Moving Averages; Introduction; Section I: Averages over Cubes; Proof of Theorem 1.1. part a); Proof of Theorem 1.1. part b); Section 2: Averages over Rectangles; Proof of Theorem 2.1 part b; Section 3: Strong Sweeping Out; References; Chapter 12. An Almost Sure Convergence Theorem For Sequences of Random Variables Selected From Log-Convex Sets

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