DBpedia 2014 |

DBpedia 2014

Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Solovay_model> ?p ?o. }

Showing items 1 to 37 of 37 with 100 items per page.

Solovay_model abstract "In the mathematical field of set theory, the Solovay model is a model constructed by Robert M. Solovay (1970) in which all of the axioms of Zermelo–Fraenkel set theory (ZF) hold, exclusive of the axiom of choice, but in which all sets of real numbers are Lebesgue measurable. The construction relies on the existence of an inaccessible cardinal.In this way Solovay showed that the axiom of choice is essential to the proof of the existence of a non-measurable set, at least granted that the existence of an inaccessible cardinal is consistent with ZFC, the axioms of Zermelo–Fraenkel set theory including the axiom of choice.".
Solovay_model wikiPageID "25274967".
Solovay_model wikiPageRevisionID "447972471".
Solovay_model authorlink "Robert M. Solovay".
Solovay_model b "3".
Solovay_model first "Robert M.".
Solovay_model hasPhotoCollection Solovay_model.
Solovay_model last "Solovay".
Solovay_model p "1".
Solovay_model year "1970".
Solovay_model subject Category:Large_cardinals.
Solovay_model subject Category:Measure_theory.
Solovay_model subject Category:Set_theory.
Solovay_model type Bishop109857200.
Solovay_model type Cardinal109894143.
Solovay_model type CausalAgent100007347.
Solovay_model type Clergyman109927451.
Solovay_model type LargeCardinals.
Solovay_model type Leader109623038.
Solovay_model type LivingThing100004258.
Solovay_model type Object100002684.
Solovay_model type Organism100004475.
Solovay_model type Person100007846.
Solovay_model type PhysicalEntity100001930.
Solovay_model type Priest110470779.
Solovay_model type SpiritualLeader109505153.
Solovay_model type Whole100003553.
Solovay_model type YagoLegalActor.
Solovay_model type YagoLegalActorGeo.
Solovay_model comment "In the mathematical field of set theory, the Solovay model is a model constructed by Robert M. Solovay (1970) in which all of the axioms of Zermelo–Fraenkel set theory (ZF) hold, exclusive of the axiom of choice, but in which all sets of real numbers are Lebesgue measurable.".
Solovay_model label "Solovay model".
Solovay_model sameAs m.09gcr4d.
Solovay_model sameAs Q7558851.
Solovay_model sameAs Q7558851.
Solovay_model sameAs Solovay_model.
Solovay_model wasDerivedFrom Solovay_model?oldid=447972471.
Solovay_model isPrimaryTopicOf Solovay_model.