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- Borel–Cantelli_lemma abstract "In probability theory, the Borel–Cantelli lemma is a theorem about sequences of events. In general, it is a result in measure theory. It is named after Émile Borel and Francesco Paolo Cantelli, who gave statement to the lemma in the first decades of the 20th century. A related result, sometimes called the second Borel–Cantelli lemma, is a partial converse of the first Borel–Cantelli lemma. The lemma states that, under certain conditions, an event will have probability either zero or one. As such, it is the best-known of a class of similar theorems, known as zero-one laws. Other examples include the Kolmogorov 0-1 law and the Hewitt–Savage zero-one law.".
- Borel–Cantelli_lemma wikiPageExternalLink BorelCantelliLemma.html.
- Borel–Cantelli_lemma wikiPageID "44987".
- Borel–Cantelli_lemma wikiPageLength "12876".
- Borel–Cantelli_lemma wikiPageOutDegree "42".
- Borel–Cantelli_lemma wikiPageRevisionID "707282693".
- Borel–Cantelli_lemma wikiPageWikiLink Almost_surely.
- Borel–Cantelli_lemma wikiPageWikiLink Category:Covering_lemmas.
- Borel–Cantelli_lemma wikiPageWikiLink Category:Lemmas.
- Borel–Cantelli_lemma wikiPageWikiLink Category:Probability_theorems.
- Borel–Cantelli_lemma wikiPageWikiLink Category:Theorems_in_measure_theory.
- Borel–Cantelli_lemma wikiPageWikiLink Compact_space.
- Borel–Cantelli_lemma wikiPageWikiLink Converse_(logic).
- Borel–Cantelli_lemma wikiPageWikiLink Doobs_martingale_convergence_theorems.
- Borel–Cantelli_lemma wikiPageWikiLink Event_(probability_theory).
- Borel–Cantelli_lemma wikiPageWikiLink Expected_value.
- Borel–Cantelli_lemma wikiPageWikiLink Francesco_Paolo_Cantelli.
- Borel–Cantelli_lemma wikiPageWikiLink Hewitt–Savage_zero–one_law.
- Borel–Cantelli_lemma wikiPageWikiLink Independence_(probability_theory).
- Borel–Cantelli_lemma wikiPageWikiLink Indicator_function.
- Borel–Cantelli_lemma wikiPageWikiLink Infimum_and_supremum.
- Borel–Cantelli_lemma wikiPageWikiLink Infinite_monkey_theorem.
- Borel–Cantelli_lemma wikiPageWikiLink Iverson_bracket.
- Borel–Cantelli_lemma wikiPageWikiLink Kolmogorovs_zeroxe2x80x93one_law.
- Borel–Cantelli_lemma wikiPageWikiLink Kuratowski_convergence.
- Borel–Cantelli_lemma wikiPageWikiLink Lebesgue_measure.
- Borel–Cantelli_lemma wikiPageWikiLink Linearity.
- Borel–Cantelli_lemma wikiPageWikiLink Markovs_inequality.
- Borel–Cantelli_lemma wikiPageWikiLink Measure_(mathematics).
- Borel–Cantelli_lemma wikiPageWikiLink Monotone_class_theorem.
- Borel–Cantelli_lemma wikiPageWikiLink Monotone_convergence_theorem.
- Borel–Cantelli_lemma wikiPageWikiLink Pairwise_independence.
- Borel–Cantelli_lemma wikiPageWikiLink Probability_space.
- Borel–Cantelli_lemma wikiPageWikiLink Probability_theory.
- Borel–Cantelli_lemma wikiPageWikiLink Random_variable.
- Borel–Cantelli_lemma wikiPageWikiLink Sequence.
- Borel–Cantelli_lemma wikiPageWikiLink Set-theoretic_limit.
- Borel–Cantelli_lemma wikiPageWikiLink Sigma-algebra.
- Borel–Cantelli_lemma wikiPageWikiLink Stochastic_process.
- Borel–Cantelli_lemma wikiPageWikiLink Theorem.
- Borel–Cantelli_lemma wikiPageWikiLink Émile_Borel.
- Borel–Cantelli_lemma wikiPageWikiLinkText "Borel–Cantelli lemma".
- Borel–Cantelli_lemma wikiPageWikiLinkText "Borel–Cantelli lemma".
- Borel–Cantelli_lemma first "A.V.".
- Borel–Cantelli_lemma id "B/b017040".
- Borel–Cantelli_lemma last "Prokhorov".
- Borel–Cantelli_lemma title "Borel–Cantelli lemma".
- Borel–Cantelli_lemma wikiPageUsesTemplate Template:Citation.
- Borel–Cantelli_lemma wikiPageUsesTemplate Template:Harv.
- Borel–Cantelli_lemma wikiPageUsesTemplate Template:More_footnotes.
- Borel–Cantelli_lemma wikiPageUsesTemplate Template:Pi.
- Borel–Cantelli_lemma wikiPageUsesTemplate Template:Reflist.
- Borel–Cantelli_lemma wikiPageUsesTemplate Template:Springer.
- Borel–Cantelli_lemma subject Category:Covering_lemmas.
- Borel–Cantelli_lemma subject Category:Lemmas.
- Borel–Cantelli_lemma subject Category:Probability_theorems.
- Borel–Cantelli_lemma subject Category:Theorems_in_measure_theory.
- Borel–Cantelli_lemma hypernym Theorem.
- Borel–Cantelli_lemma type Lemma.
- Borel–Cantelli_lemma type Redirect.
- Borel–Cantelli_lemma type Theorem.
- Borel–Cantelli_lemma comment "In probability theory, the Borel–Cantelli lemma is a theorem about sequences of events. In general, it is a result in measure theory. It is named after Émile Borel and Francesco Paolo Cantelli, who gave statement to the lemma in the first decades of the 20th century. A related result, sometimes called the second Borel–Cantelli lemma, is a partial converse of the first Borel–Cantelli lemma. The lemma states that, under certain conditions, an event will have probability either zero or one.".
- Borel–Cantelli_lemma label "Borel–Cantelli lemma".
- Borel–Cantelli_lemma sameAs Q893496.
- Borel–Cantelli_lemma sameAs Borel-Cantellis_lemmaer.
- Borel–Cantelli_lemma sameAs Borel-Cantelli-Lemma.
- Borel–Cantelli_lemma sameAs Lema_de_Borel-Cantelli.
- Borel–Cantelli_lemma sameAs Théorème_de_Borel-Cantelli.
- Borel–Cantelli_lemma sameAs הלמה_של_בורל-קנטלי.
- Borel–Cantelli_lemma sameAs Lemma_di_Borel-Cantelli.
- Borel–Cantelli_lemma sameAs 보렐-칸텔리_보조정리.
- Borel–Cantelli_lemma sameAs Lemma_ta’_Borel-Cantelli.
- Borel–Cantelli_lemma sameAs Lemma_van_Borel-Cantelli.
- Borel–Cantelli_lemma sameAs Lematy_Borela-Cantellego.
- Borel–Cantelli_lemma sameAs Lema_de_Borel-Cantelli.
- Borel–Cantelli_lemma sameAs m.0c7wy.
- Borel–Cantelli_lemma sameAs Лемма_Бореля_—_Кантелли.
- Borel–Cantelli_lemma sameAs Borel–Cantellis_lemma.
- Borel–Cantelli_lemma sameAs Borel-Cantelli_lemması.
- Borel–Cantelli_lemma sameAs Лема_Бореля_—_Кантеллі.
- Borel–Cantelli_lemma sameAs Bổ_đề_Borel-Cantelli.
- Borel–Cantelli_lemma sameAs Q893496.
- Borel–Cantelli_lemma sameAs 波莱尔-坎泰利引理.
- Borel–Cantelli_lemma wasDerivedFrom Borel–Cantelli_lemma?oldid=707282693.
- Borel–Cantelli_lemma isPrimaryTopicOf Borel–Cantelli_lemma.