REPRESENTATIONS OF WEAK AND STRONG INTEGRALS IN BANACH SPACES
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Publication:5579935
DOI10.1073/pnas.63.2.266zbMath0186.20302OpenAlexW2036487249WikidataQ36449048 ScholiaQ36449048MaRDI QIDQ5579935
Publication date: 1969
Published in: Proceedings of the National Academy of Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1073/pnas.63.2.266
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The McShane, PU and Henstock integrals of Banach valued functions ⋮ Some Strong and Weak Limit Theorems for Weighted Sums of i.i.d. Banach Space Valued Random Elements with Slowly Varying Weights ⋮ On ergodic theorem for a Banach valued random sequence ⋮ Integrability for the Dobrakov integral ⋮ On Vector Measures ⋮ Convergence theorm for weak banach valued martingales ⋮ Non absolutely convergent integrals of functions taking values in a locally convex space ⋮ A Characterization of Strongly Measurable Pettis Integrable Functions ⋮ Some remarks on the strong law of large numbers for Banach-space valued weakly integrable random variables ⋮ An elementary characterization of absolutely summing operators ⋮ A characterization of absolutely summing operators by means of McShane integrable functions ⋮ Strong and Weak Laws of Large Numbers for Double Sums of Independent Random Elements in Rademacher TypepBanach Spaces
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