Subtle cardinal

In mathematics, subtle cardinals and ethereal cardinals are closely related kinds of large cardinal number.

A cardinal $κ$ is called subtle if for every closed and unbounded $C \subset κ$ and for every sequence $(A_{δ})_{δ < κ}$ of length $κ$ such that $A_{δ} \subset δ$ for all $δ < κ$ (where $A_{δ}$ is the $δ$ th element), there exist $α, β$ , belonging to $C$ , with $α < β$ , such that $A_{α} = A_{β} \cap α$ .

A cardinal $κ$ is called ethereal if for every closed and unbounded $C \subset κ$ and for every sequence $(A_{δ})_{δ < κ}$ of length $κ$ such that $A_{δ} \subset δ$ and $A_{δ}$ has the same cardinality as $δ$ for arbitrary $δ < κ$ , there exist $α, β$ , belonging to $C$ , with $α < β$ , such that $card (α) = c a r d (A_{β} \cup A_{α})$ .^[1]

Subtle cardinals were introduced by Template:Harvtxt. Ethereal cardinals were introduced by Template:Harvtxt. Any subtle cardinal is ethereal,^[1]^{p. 388} and any strongly inaccessible ethereal cardinal is subtle.^[1]^{p. 391}

Characterizations

Some equivalent properties to subtlety are known.

Relationship to Vopěnka's Principle

Subtle cardinals are equivalent to a weak form of Vopěnka cardinals. Namely, an inaccessible cardinal $κ$ is subtle if and only if in $V_{κ + 1}$ , any logic has stationarily many weak compactness cardinals.^[2]

Vopenka's principle itself may be stated as the existence of a strong compactness cardinal for each logic.

Chains in transitive sets

There is a subtle cardinal $\leq κ$ if and only if every transitive set $S$ of cardinality $κ$ contains $x$ and $y$ such that $x$ is a proper subset of $y$ and $x \neq \emptyset$ and $x \neq {\emptyset}$ .^[3]^{Corollary 2.6} If a cardinal $λ$ is subtle, then for every $α < λ$ , every transitive set $S$ of cardinality $λ$ includes a chain (under inclusion) of order type $α$ .^[3]^{Theorem 2.2}

Extensions

A hypersubtle cardinal is a subtle cardinal which has a stationary set of subtle cardinals below it.^[4]^p.1014

References

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Citations

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↑ ^a ^b ^c Script error: No such module "citation/CS1".
↑ W. Boney, S. Dimopoulos, V. Gitman, M. Magidor "Model Theoretic Characterizations of Large Cardinals Revisited" (2023).
↑ ^a ^b H. Friedman, "Primitive Independence Results" (2002). Accessed 18 April 2024.
↑ C. Henrion, "Properties of Subtle Cardinals. Journal of Symbolic Logic, vol. 52, no. 4 (1987), pp.1005--1019."

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[2] W. Boney, S. Dimopoulos, V. Gitman, M. Magidor "Model Theoretic Characterizations of Large Cardinals Revisited" (2023).

[Friedman02-3] H. Friedman, "Primitive Independence Results" (2002). Accessed 18 April 2024.

[Henrion87-4] C. Henrion, "Properties of Subtle Cardinals. Journal of Symbolic Logic, vol. 52, no. 4 (1987), pp.1005--1019."

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Subtle cardinal

Contents

Characterizations

Relationship to Vopěnka's Principle

Chains in transitive sets

Extensions

See also

References

Citations

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Subtle cardinal

Characterizations

Relationship to Vopěnka's Principle

Chains in transitive sets

Extensions

See also

References

Citations

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