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 ⊂ κ and for every sequence A of length κ for which element number δ (for an arbitrary δ), A_δ ⊂ δ, there exist α, β, belonging to C, with α < β, such that A_α = A_β ∩ α.

A cardinal κ is called ethereal if for every closed and unbounded C ⊂ κ and for every sequence A of length κ for which element number δ (for an arbitrary δ), A_δ ⊂ δ and A_δ has the same cardinal as δ, there exist α, β, belonging to C, with α < β, such that card(α) = card(A_β ∩ A_α).

Subtle cardinals were introduced by Jensen & Kunen (1969). Ethereal cardinals were introduced by Ketonen (1974). Any subtle cardinal is ethereal, and any strongly inaccessible ethereal cardinal is subtle.

Relationship to Vopěnka's Principle[edit]

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

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

Theorem[edit]

There is a subtle cardinal ≤ 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 ≠ Ø and x ≠ {Ø}.^{[2]Corollary 2.6} An infinite ordinal κ is subtle if and only if for every λ < κ, every transitive set S of cardinality κ includes a chain (under inclusion) of order type λ.

Extensions[edit]

A hypersubtle cardinal is a subtle cardinal which has a stationary set of subtle cardinals below it.^[3]p.1014

See also[edit]

• List of large cardinal properties

References[edit]

Citations[edit]

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