Results 51 to 60 of about 85 (70)

Egoroff’s theorem and maximal run length

Monatshefte für Mathematik, 2007
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Ma, Ji-Hua, Wen, Sheng-You, Wen, Zhi-Ying   +2 more
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Ideal generalizations of Egoroff’s theorem

Archive for Mathematical Logic, 2020
We investigate the classes of ideals for which the Egoroff’s theorem or the generalized Egoroff’s theorem holds between ideal versions of pointwise and uniform convergences. The paper is motivated by considerations of Korch (Real Anal Exchange 42(2):269–282, 2017).
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A set-valued Egoroff type theorem

Fuzzy Sets and Systems, 2011
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Anca Precupanu, Alina Gavrilut
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Conditions for Egoroff's theorem in non-additive measure theory

Fuzzy Sets and Systems, 2004
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Toshiaki Murofushi, Kenta Uchino, Shin Asahina   +2 more
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EGOROFF'S THEOREM ON MONOTONE NON-ADDITIVE MEASURE SPACES

International Journal of Uncertainty, Fuzziness and Knowledge-Based Systems, 2004
In this paper, the well-known Egoroff's theorem in classical measure theory is established on monotone non-additive measure spaces. Taylor's theorem, which concerns almost everywhere convergence of measurable function sequence in classical measure theory, is also generalized.
Jun Li 0014, Masami Yasuda
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Generalized Egoroff’s theorem

Tatra Mountains Mathematical Publications, 2009
Abstract This note is closely related to the paper [R. Pinciroli: On theindependence of a generalized statement of Egoroff’s theorem from ZFC afterT. Weiss, Real Anal. Exchange 32 (2006-2007), 225-232] and it presents slight improvements of its results.
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Some notes on monotone set-valued measures and Egoroff's theorem

Fuzzy Sets and Systems, 2022
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On Egoroff's theorems on finite monotone non-additive measure space

Fuzzy Sets and Systems, 2005
The paper continues and develops the investigation of the Egoroff theorem for finite fuzzy measures (non-additive measures) originated in [\textit{J. Li}, Kybernetika 39, No. 6, 753--760 (2003)]. Four versions of the Egoroff theorem are presented and the connections between some special properties of fuzzy measures are discussed.
Jun Li 0014, Masami Yasuda
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The Egoroff property and the Egoroff theorem in Riesz space-valued non-additive measure theory

Fuzzy Sets and Systems, 2007
The author obtains some extensions of Egoroff's condition to non-additive, Riesz space valued measures. Here \(\mathcal{F}\) is a \(\sigma\)-algebra of subsets of \(X\), \(V\) is a Riesz space and \(\mu: \mathcal{F} \to V\) is a non-additive measure, which means it is monotone with \( \mu(\emptyset) =0\).
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A new necessary and sufficient condition for the Egoroff theorem in non-additive measure theory

Fuzzy Sets and Systems, 2014
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Masayuki Takahashi, Toshiaki Murofushi, Shin Asahina   +2 more
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