# Inaccessible cardinal Information

*https://en.wikipedia.org/wiki/Strongly_inaccessible_cardinal*

In
set theory, an
uncountable
cardinal is **inaccessible** if it cannot be obtained from smaller cardinals by the usual operations of
cardinal arithmetic. More precisely, a cardinal is **strongly inaccessible** if it is uncountable, it is not a sum of fewer than cardinals that are less than , and implies .

The term "inaccessible cardinal" is ambiguous. Until about 1950, it meant "weakly inaccessible cardinal", but since then it usually means "strongly inaccessible cardinal". An uncountable cardinal is **weakly inaccessible** if it is a
regular
weak limit cardinal. It is strongly inaccessible, or just inaccessible, if it is a regular strong limit cardinal (this is equivalent to the definition given above). Some authors do not require weakly and strongly inaccessible cardinals to be uncountable (in which case is strongly inaccessible). Weakly inaccessible cardinals were introduced by
Hausdorff (1908), and strongly inaccessible ones by
Sierpiński & Tarski (1930) and
Zermelo (1930).

Every strongly inaccessible cardinal is also weakly inaccessible, as every strong limit cardinal is also a weak limit cardinal. If the generalized continuum hypothesis holds, then a cardinal is strongly inaccessible if and only if it is weakly inaccessible.

( aleph-null) is a regular strong limit cardinal. Assuming the axiom of choice, every other infinite cardinal number is regular or a (weak) limit. However, only a rather large cardinal number can be both and thus weakly inaccessible.

An ordinal is a weakly inaccessible cardinal if and only if it is a regular ordinal and it is a limit of regular ordinals. (Zero, one, and are regular ordinals, but not limits of regular ordinals.) A cardinal which is weakly inaccessible and also a strong limit cardinal is strongly inaccessible.

The assumption of the existence of a strongly inaccessible cardinal is sometimes applied in the form of the assumption that one can work inside a Grothendieck universe, the two ideas being intimately connected.

## Models and consistency

Zermelo–Fraenkel set theory with Choice (ZFC) implies that the
*V*_{κ} is a
model of ZFC whenever *κ* is strongly inaccessible. And ZF implies that the
Gödel universe *L*_{κ} is a model of ZFC whenever *κ* is weakly inaccessible. Thus, ZF together with "there exists a weakly inaccessible cardinal" implies that ZFC is consistent. Therefore, inaccessible cardinals are a type of
large cardinal.

If *V* is a standard model of ZFC and *κ* is an inaccessible in *V*, then: *V*_{κ} is one of the intended models of
Zermelo–Fraenkel set theory; and Def(*V*_{κ}) is one of the intended models of Mendelson's version of
Von Neumann–Bernays–Gödel set theory which excludes global choice, replacing limitation of size by replacement and ordinary choice; and *V*_{κ+1} is one of the intended models of
Morse–Kelley set theory. Here Def (*X*) is the Δ_{0} definable subsets of *X* (see
constructible universe). However, *κ* does not need to be inaccessible, or even a cardinal number, in order for *V*_{κ} to be a standard model of ZF (see
below).

Suppose V is a model of ZFC. Either V contains no strong inaccessible or, taking *κ* to be the smallest strong inaccessible in V, *V*_{κ} is a standard model of ZFC which contains no strong inaccessibles. Thus, the consistency of ZFC implies consistency of ZFC+"there are no strong inaccessibles". Similarly, either V contains no weak inaccessible or, taking *κ* to be the smallest ordinal which is weakly inaccessible relative to any standard sub-model of V, then *L*_{κ} is a standard model of ZFC which contains no weak inaccessibles. So consistency of ZFC implies consistency of ZFC+"there are no weak inaccessibles". This shows that ZFC cannot prove the existence of an inaccessible cardinal, so ZFC is consistent with the non-existence of any inaccessible cardinals.

The issue whether ZFC is consistent with the existence of an inaccessible cardinal is more subtle. The proof sketched in the previous paragraph that the consistency of ZFC implies the consistency of ZFC + "there is not an inaccessible cardinal" can be formalized in ZFC. However, assuming that ZFC is consistent, no proof that the consistency of ZFC implies the consistency of ZFC + "there is an inaccessible cardinal" can be formalized in ZFC. This follows from Gödel's second incompleteness theorem, which shows that if ZFC + "there is an inaccessible cardinal" is consistent, then it cannot prove its own consistency. Because ZFC + "there is an inaccessible cardinal" does prove the consistency of ZFC, if ZFC proved that its own consistency implies the consistency of ZFC + "there is an inaccessible cardinal" then this latter theory would be able to prove its own consistency, which is impossible if it is consistent.

There are arguments for the existence of inaccessible cardinals that cannot be formalized in ZFC. One such argument, presented by
Hrbáček & Jech (1999, p. 279), is that the class of all ordinals of a particular model *M* of set theory would itself be an inaccessible cardinal if there was a larger model of set theory extending *M* and preserving powerset of elements of *M*.

## Existence of a proper class of inaccessibles

There are many important axioms in set theory which assert the existence of a proper class of cardinals which satisfy a predicate of interest. In the case of inaccessibility, the corresponding axiom is the assertion that for every cardinal *μ*, there is an inaccessible cardinal *κ* which is strictly larger, *μ* < *κ*. Thus, this axiom guarantees the existence of an infinite tower of inaccessible cardinals (and may occasionally be referred to as the inaccessible cardinal axiom). As is the case for the existence of any inaccessible cardinal, the inaccessible cardinal axiom is unprovable from the axioms of ZFC. Assuming ZFC, the inaccessible cardinal axiom is equivalent to the **universe axiom** of
Grothendieck and
Verdier: every set is contained in a
Grothendieck universe. The axioms of ZFC along with the universe axiom (or equivalently the inaccessible cardinal axiom) are denoted ZFCU (which could be confused with ZFC with
urelements). This axiomatic system is useful to prove for example that every
category has an appropriate
Yoneda embedding.

This is a relatively weak large cardinal axiom since it amounts to saying that ∞ is 1-inaccessible in the language of the next section, where ∞ denotes the least ordinal not in V, i.e. the class of all ordinals in your model.

*α*-inaccessible cardinals and hyper-inaccessible cardinals

The term "*α*-inaccessible cardinal" is ambiguous and different authors use inequivalent definitions. One definition is that
a cardinal *κ* is called ** α-inaccessible**, for

*α*any ordinal, if

*κ*is inaccessible and for every ordinal

*β*<

*α*, the set of

*β*-inaccessibles less than

*κ*is unbounded in

*κ*(and thus of cardinality

*κ*, since

*κ*is regular). In this case the 0-inaccessible cardinals are the same as strongly inaccessible cardinals. Another possible definition is that a cardinal

*κ*is called

**if**

*α*-weakly inaccessible*κ*is regular and for every ordinal

*β*<

*α*, the set of

*β*-weakly inaccessibles less than

*κ*is unbounded in κ. In this case the 0-weakly inaccessible cardinals are the regular cardinals and the 1-weakly inaccessible cardinals are the weakly inaccessible cardinals.

The *α*-inaccessible cardinals can also be described as fixed points of functions which count the lower inaccessibles. For example, denote by *ψ*_{0}(*λ*) the *λ*^{th} inaccessible cardinal, then the fixed points of *ψ*_{0} are the 1-inaccessible cardinals. Then letting *ψ*_{β}(*λ*) be the *λ*^{th} *β*-inaccessible cardinal, the fixed points of *ψ*_{β} are the (*β*+1)-inaccessible cardinals (the values *ψ*_{β+1}(*λ*)). If *α* is a limit ordinal, an *α*-inaccessible is a fixed point of every *ψ*_{β} for *β* < *α* (the value *ψ*_{α}(*λ*) is the *λ*^{th} such cardinal). This process of taking fixed points of functions generating successively larger cardinals is commonly encountered in the study of
large cardinal numbers.

The term **hyper-inaccessible** is ambiguous and has at least three incompatible meanings. Many authors use it to mean a regular limit of strongly inaccessible cardinals (1-inaccessible). Other authors use it to mean that *κ* is *κ*-inaccessible. (It can never be *κ*+1-inaccessible.) It is occasionally used to mean
Mahlo cardinal.

The term ** α-hyper-inaccessible** is also ambiguous. Some authors use it to mean

*α*-inaccessible. Other authors use the definition that for any ordinal

*α*, a cardinal

*κ*is

**if and only if**

*α*-hyper-inaccessible*κ*is hyper-inaccessible and for every ordinal

*β*<

*α*, the set of

*β*-hyper-inaccessibles less than

*κ*is unbounded in

*κ*.

Hyper-hyper-inaccessible cardinals and so on can be defined in similar ways, and as usual this term is ambiguous.

Using "weakly inaccessible" instead of "inaccessible", similar definitions can be made for "weakly *α*-inaccessible", "weakly hyper-inaccessible", and "weakly *α*-hyper-inaccessible".

Mahlo cardinals are inaccessible, hyper-inaccessible, hyper-hyper-inaccessible, ... and so on.

## Two model-theoretic characterisations of inaccessibility

Firstly, a cardinal *κ* is inaccessible if and only if *κ* has the following
reflection property: for all subsets U ⊂ V_{κ}, there exists *α* < *κ* such that is an
elementary substructure of . (In fact, the set of such *α* is
closed unbounded in *κ*.) Equivalently, *κ* is -
indescribable for all n ≥ 0.

It is provable in ZF that ∞ satisfies a somewhat weaker reflection property, where the substructure (V_{α}, ∈, U ∩ V_{α}) is only required to be 'elementary' with respect to a finite set of formulas. Ultimately, the reason for this weakening is that whereas the model-theoretic satisfaction relation can be defined, truth itself cannot, due to
Tarski's theorem.

Secondly, under ZFC it can be shown that *κ* is inaccessible if and only if (V_{κ}, ∈) is a model of
second order ZFC.

In this case, by the reflection property above, there exists *α* < *κ* such that (V_{α}, ∈) is a standard model of (
first order) ZFC. Hence, the existence of an inaccessible cardinal is a stronger hypothesis than the existence of a standard model of ZFC.

## See also

## Works cited

- Drake, F. R. (1974),
*Set Theory: An Introduction to Large Cardinals*, Studies in Logic and the Foundations of Mathematics,**76**, Elsevier Science, ISBN 0-444-10535-2 -
Hausdorff, Felix (1908),
"Grundzüge einer Theorie der geordneten Mengen",
*Mathematische Annalen*,**65**(4): 435–505, doi: 10.1007/BF01451165, hdl: 10338.dmlcz/100813, ISSN 0025-5831 -
Hrbáček, Karel;
Jech, Thomas (1999),
*Introduction to set theory*(3rd ed.), New York: Dekker, ISBN 978-0-8247-7915-3 -
Kanamori, Akihiro (2003),
*The Higher Infinite: Large Cardinals in Set Theory from Their Beginnings*(2nd ed.), Springer, ISBN 3-540-00384-3 -
Sierpiński, Wacław;
Tarski, Alfred (1930),
"Sur une propriété caractéristique des nombres inaccessibles" (PDF),
*Fundamenta Mathematicae*,**15**: 292–300, ISSN 0016-2736 -
Zermelo, Ernst (1930),
"Über Grenzzahlen und Mengenbereiche: neue Untersuchungen über die Grundlagen der Mengenlehre" (PDF),
*Fundamenta Mathematicae*,**16**: 29–47, ISSN 0016-2736. English translation: Ewald, William B. (1996), "On boundary numbers and domains of sets: new investigations in the foundations of set theory",*From Immanuel Kant to David Hilbert: A Source Book in the Foundations of Mathematics*, Oxford University Press, pp. 1208–1233, ISBN 978-0-19-853271-2.