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- Hewitt–Savage_zero–one_law abstract "The Hewitt–Savage zero–one law is a theorem in probability theory, similar to Kolmogorov's zero–one law and the Borel–Cantelli lemma, that specifies that a certain type of event will either almost surely happen or almost surely not happen. It is sometimes known as the Hewitt–Savage law for symmetric events. It is named after Edwin Hewitt and Leonard Jimmie Savage.".
- Hewitt–Savage_zero–one_law wikiPageID "6595367".
- Hewitt–Savage_zero–one_law wikiPageRevisionID "592287714".
- Hewitt–Savage_zero–one_law subject Category:Covering_lemmas.
- Hewitt–Savage_zero–one_law subject Category:Probability_theorems.
- Hewitt–Savage_zero–one_law comment "The Hewitt–Savage zero–one law is a theorem in probability theory, similar to Kolmogorov's zero–one law and the Borel–Cantelli lemma, that specifies that a certain type of event will either almost surely happen or almost surely not happen. It is sometimes known as the Hewitt–Savage law for symmetric events. It is named after Edwin Hewitt and Leonard Jimmie Savage.".
- Hewitt–Savage_zero–one_law label "Hewitt–Savage zero–one law".
- Hewitt–Savage_zero–one_law sameAs Hewitt%E2%80%93Savage_zero%E2%80%93one_law.
- Hewitt–Savage_zero–one_law sameAs Q5748532.
- Hewitt–Savage_zero–one_law sameAs Q5748532.
- Hewitt–Savage_zero–one_law wasDerivedFrom Hewitt–Savage_zero–one_law?oldid=592287714.