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A question about Ordinal Definableordinal definable sets and Large Cardinal Axiomslarge cardinal axioms
It is well known that the Large Cardinal Axiom which asserts the existence of a Measurablemeasurable cardinal number is inconsistent with V=L. Do any of the well-known Large Cardinal Axioms contradict V=OD?
A question about Ordinal Definable sets and Large Cardinal Axioms
It is well known that the Large Cardinal Axiom which asserts the existence of a Measurable cardinal number is inconsistent with V=L. Do any of the well-known Large Cardinal Axioms contradict V=OD?
A question about ordinal definable sets and large cardinal axioms
It is well known that the Large Cardinal Axiom which asserts the existence of a measurable cardinal number is inconsistent with V=L. Do any of the well-known Large Cardinal Axioms contradict V=OD?
A question about Ordinal Definable sets and LarrgeLarge Cardinal Axioms
It is well known that the Large Cardinal Axiom which asserts the existence of a Measurable cardinal number is inconsistent with V=L. Do any of the well known-known Large Cardinal Axioms contradict V=OD?
A question about Ordinal Definable sets and Larrge Cardinal Axioms
It is well known that the Large Cardinal Axiom which asserts the existence of a Measurable cardinal number is inconsistent with V=L. Do any of the well known Large Cardinal Axioms contradict V=OD?
A question about Ordinal Definable sets and Large Cardinal Axioms
It is well known that the Large Cardinal Axiom which asserts the existence of a Measurable cardinal number is inconsistent with V=L. Do any of the well-known Large Cardinal Axioms contradict V=OD?
