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- Postselection abstract "In probability theory, to postselect is to condition a probability space upon the occurrence of a given event. In symbols, once we postselect for an event E, the probability of some other event F changes from Pr[F] to the conditional probability Pr[F|E].For a discrete probability space, Pr[F|E] = Pr[F and E]/Pr[E], and thus we require that Pr[E] be strictly positive in order for the postselection to be well-defined.See also PostBQP, a complexity class defined with postselection. Using postselection it seems quantum Turing machines are much more powerful: Scott Aaronson proved PostBQP is equal to PP.".
- Postselection wikiPageID "23776575".
- Postselection wikiPageLength "1523".
- Postselection wikiPageOutDegree "11".
- Postselection wikiPageRevisionID "601719008".
- Postselection wikiPageWikiLink Category:Probability_theory.
- Postselection wikiPageWikiLink Category:Theoretical_computer_science.
- Postselection wikiPageWikiLink Conditional_probability.
- Postselection wikiPageWikiLink Discrete_probability_distribution.
- Postselection wikiPageWikiLink PP_(complexity).
- Postselection wikiPageWikiLink PostBQP.
- Postselection wikiPageWikiLink Probability_distribution.
- Postselection wikiPageWikiLink Probability_space.
- Postselection wikiPageWikiLink Probability_theory.
- Postselection wikiPageWikiLink Quantum_Turing_machine.
- Postselection wikiPageWikiLink Scott_Aaronson.
- Postselection wikiPageWikiLinkText "postselection".
- Postselection hasPhotoCollection Postselection.
- Postselection wikiPageUsesTemplate Template:Comp-sci-theory-stub.
- Postselection wikiPageUsesTemplate Template:Probability-stub.
- Postselection subject Category:Probability_theory.
- Postselection subject Category:Theoretical_computer_science.
- Postselection type Area.
- Postselection type Article.
- Postselection type Area.
- Postselection type Article.
- Postselection comment "In probability theory, to postselect is to condition a probability space upon the occurrence of a given event. In symbols, once we postselect for an event E, the probability of some other event F changes from Pr[F] to the conditional probability Pr[F|E].For a discrete probability space, Pr[F|E] = Pr[F and E]/Pr[E], and thus we require that Pr[E] be strictly positive in order for the postselection to be well-defined.See also PostBQP, a complexity class defined with postselection.".
- Postselection label "Postselection".
- Postselection sameAs m.06zjsgy.
- Postselection sameAs Q7234498.
- Postselection sameAs Q7234498.
- Postselection wasDerivedFrom Postselection?oldid=601719008.
- Postselection isPrimaryTopicOf Postselection.