Some results concerning ideal and classical uniform integrability and mean convergence
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Al Hayek, Nour [1] ; Ordóñez Cabrera, Manuel [2] ; Rosalsky, Andrew [3] ; Ünver, Mehmet [4] ; Volodin, Andrei [5]
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[1] Kazan Federal University
Kazan Federal University
Rusia
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[2] Universidad de Sevilla
Universidad de Sevilla
Sevilla, España
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[3] University of Florida
University of Florida
Estados Unidos
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[4] Ankara University
Ankara University
Turquía
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[5] University of Regina
University of Regina
Canadá
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- Localización: Collectanea mathematica, ISSN 0010-0757, Vol. 74, Fasc. 1, 2023, págs. 1-25
- Idioma: inglés
- Texto completo no disponible (Saber más ...)
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Resumen
In this article, the concept of J-uniform integrability of a sequence of random variables {Xk} with respect to {ank} is introduced where J is a non-trivial ideal of subsets of the set of positive integers and {ank} is an array of real numbers. We show that this concept is weaker than the concept of {Xk} being uniformly integrable with respect to {ank} and is more general than the concept of B-statistical uniform integrability with respect to {ank}. We give two characterizations of J-uniform integrability with respect to {ank}. One of them is a de La Vallée Poussin type characterization. For a sequence of pairwise independent random variables {Xk} which is J-uniformly integrable with respect to {ank}, a law of large numbers with mean ideal convergence is proved. We also obtain a version without the pairwise independence assumption by strengthening other conditions. Supplements to the classical Mean Convergence Criterion are also established.
