About: Axiom of projective determinacy

Property	Value
dbo:abstract	In mathematical logic, projective determinacy is the special case of the axiom of determinacy applying only to projective sets. The axiom of projective determinacy, abbreviated PD, states that for any two-player infinite game of perfect information of length ω in which the players play natural numbers, if the victory set (for either player, since the projective sets are closed under complementation) is projective, then one player or the other has a winning strategy. The axiom is not a theorem of ZFC (assuming ZFC is consistent), but unlike the full axiom of determinacy (AD), which contradicts the axiom of choice, it is not known to be inconsistent with ZFC. PD follows from certain large cardinal axioms, such as the existence of infinitely many Woodin cardinals. PD implies that all projective sets are Lebesgue measurable (in fact, universally measurable) and have the perfect set property and the property of Baire. It also implies that every projective binary relation may be uniformized by a projective set. (en)
dbo:wikiPageExternalLink	http://www.math.ucla.edu/~ynm/lectures/dst2009/dst2009.pdf https://web.archive.org/web/20141112111558/http:/www.math.ucla.edu/~ynm/lectures/dst2009/dst2009.pdf
dbo:wikiPageID	1236592 (xsd:integer)
dbo:wikiPageLength	2145 (xsd:nonNegativeInteger)
dbo:wikiPageRevisionID	1117466843 (xsd:integer)
dbo:wikiPageWikiLink	dbr:Binary_relation dbc:Game_theory dbr:Mathematical_logic dbc:Descriptive_set_theory dbr:Large_cardinal dbr:Journal_of_the_American_Mathematical_Society dbc:Axioms_of_set_theory dbc:Determinacy dbr:Woodin_cardinal dbr:ZFC dbr:Axiom_of_choice dbr:Axiom_of_determinacy dbc:Large_cardinals dbr:Winning_strategy dbr:Natural_number dbr:Uniformization_(set_theory) dbr:Perfect_set_property dbr:Perfect_information dbr:Property_of_Baire dbr:Ω_(ordinal_number) dbr:Lebesgue_measurable dbr:Universally_measurable dbr:Projective_set
dbp:wikiPageUsesTemplate	dbt:Cite_book dbt:Cite_journal dbt:Settheory-stub
dcterms:subject	dbc:Game_theory dbc:Descriptive_set_theory dbc:Axioms_of_set_theory dbc:Determinacy dbc:Large_cardinals
gold:hypernym	dbr:Case
rdf:type	dbo:SupremeCourtOfTheUnitedStatesCase
rdfs:comment	In mathematical logic, projective determinacy is the special case of the axiom of determinacy applying only to projective sets. The axiom of projective determinacy, abbreviated PD, states that for any two-player infinite game of perfect information of length ω in which the players play natural numbers, if the victory set (for either player, since the projective sets are closed under complementation) is projective, then one player or the other has a winning strategy. (en)
rdfs:label	Axiom of projective determinacy (en)
owl:sameAs	freebase:Axiom of projective determinacy yago-res:Axiom of projective determinacy wikidata:Axiom of projective determinacy https://global.dbpedia.org/id/4UThS
prov:wasDerivedFrom	wikipedia-en:Axiom_of_projective_determinacy?oldid=1117466843&ns=0
foaf:isPrimaryTopicOf	wikipedia-en:Axiom_of_projective_determinacy
is dbo:wikiPageDisambiguates of	dbr:PD
is dbo:wikiPageRedirects of	dbr:Projective_determinacy
is dbo:wikiPageWikiLink of	dbr:List_of_axioms dbr:Ω-logic dbr:Index_of_philosophy_articles_(A–C) dbr:List_of_mathematical_logic_topics dbr:List_of_set_theory_topics dbr:Glossary_of_set_theory dbr:Fallibilism dbr:PD dbr:AD+ dbr:Axiom_of_real_determinacy dbr:Borel_determinacy_theorem dbr:Projective_determinacy
is foaf:primaryTopic of	wikipedia-en:Axiom_of_projective_determinacy