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  1. Repozytorium Uniwersytetu w Białymstoku
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  3. Formalized Mathematics
  4. Formalized Mathematics, 2018, Volume 26, Issue 1

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    • Proszę używać tego identyfikatora do cytowań lub wstaw link do tej pozycji: http://hdl.handle.net/11320/6833
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    Pole DCWartośćJęzyk
    dc.contributor.authorEndou, Noboru-
    dc.date.accessioned2018-08-20T06:41:52Z-
    dc.date.available2018-08-20T06:41:52Z-
    dc.date.issued2018-
    dc.identifier.citationFormalized Mathematics, Volume 26, Issue 1, Pages 49–67-
    dc.identifier.issn1426-2630-
    dc.identifier.urihttp://hdl.handle.net/11320/6833-
    dc.description.abstractThe goal of this article is to show Fubini’s theorem for non-negative or non-positive measurable functions [10], [2], [3], using the Mizar system [1], [9]. We formalized Fubini’s theorem in our previous article [5], but in that case we showed the Fubini’s theorem for measurable sets and it was not enough as the integral does not appear explicitly. On the other hand, the theorems obtained in this paper are more general and it can be easily extended to a general integrable function. Furthermore, it also can be easy to extend to functional space Lp [12]. It should be mentioned also that Hölzl and Heller [11] have introduced the Lebesgue integration theory in Isabelle/HOL and have proved Fubini’s theorem there.-
    dc.language.isoen-
    dc.publisherDeGruyter Open-
    dc.subjectFubini’ s theorem-
    dc.subjectextended real-valued non-negative (or non-positive) measurable function-
    dc.titleFubini’s Theorem for Non-Negative or Non-Positive Functions-
    dc.typeArticle-
    dc.identifier.doi10.2478/forma-2018-0005-
    dc.description.AffiliationNational Institute of Technology, Gifu College, 2236-2 Kamimakuwa, Motosu, Gifu, Japan-
    dc.description.referencesGrzegorz Bancerek, Czesław Byliński, Adam Grabowski, Artur Korniłowicz, Roman Matuszewski, Adam Naumowicz, Karol Pąk, and Josef Urban. Mizar: State-of-the-art and beyond. In Manfred Kerber, Jacques Carette, Cezary Kaliszyk, Florian Rabe, and Volker Sorge, editors, Intelligent Computer Mathematics, volume 9150 of Lecture Notes in Computer Science, pages 261–279. Springer International Publishing, 2015. ISBN 978-3-319-20614-1. doi:10.1007/978-3-319-20615-8_17.-
    dc.description.referencesHeinz Bauer. Measure and Integration Theory. Walter de Gruyter Inc., 2002.-
    dc.description.referencesVladimir Igorevich Bogachev and Maria Aparecida Soares Ruas. Measure theory, volume 1. Springer, 2007.-
    dc.description.referencesNoboru Endou. Product pre-measure. Formalized Mathematics, 24(1):69–79, 2016. doi:10.1515/forma-2016-0006.-
    dc.description.referencesNoboru Endou. Fubini’s theorem on measure. Formalized Mathematics, 25(1):1–29, 2017. doi:10.1515/forma-2017-0001.-
    dc.description.referencesNoboru Endou and Yasunari Shidama. Integral of measurable function. Formalized Mathematics, 14(2):53–70, 2006. doi:10.2478/v10037-006-0008-x.-
    dc.description.referencesNoboru Endou, Katsumi Wasaki, and Yasunari Shidama. Basic properties of extended real numbers. Formalized Mathematics, 9(3):491–494, 2001.-
    dc.description.referencesNoboru Endou, Katsumi Wasaki, and Yasunari Shidama. The measurability of extended real valued functions. Formalized Mathematics, 9(3):525–529, 2001.-
    dc.description.referencesAdam Grabowski, Artur Korniłowicz, and Adam Naumowicz. Four decades of Mizar. Journal of Automated Reasoning, 55(3):191–198, 2015. doi:10.1007/s10817-015-9345-1.-
    dc.description.referencesP. R. Halmos. Measure Theory. Springer-Verlag, 1974.-
    dc.description.referencesJohannes Hölzl and Armin Heller. Three chapters of measure theory in Isabelle/HOL. In Marko C. J. D. van Eekelen, Herman Geuvers, Julien Schmaltz, and Freek Wiedijk, editors, Interactive Theorem Proving (ITP 2011), volume 6898 of LNCS, pages 135–151, 2011.-
    dc.description.referencesYasushige Watase, Noboru Endou, and Yasunari Shidama. On L1 space formed by real-valued partial functions. Formalized Mathematics, 16(4):361–369, 2008. doi:10.2478/v10037-008-0044-9.-
    dc.identifier.eissn1898-9934-
    dc.description.volume26-
    dc.description.issue1-
    dc.description.firstpage49-
    dc.description.lastpage67-
    dc.identifier.citation2Formalized Mathematics-
    Występuje w kolekcji(ach):Formalized Mathematics, 2018, Volume 26, Issue 1

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