Erdős cardinal

In mathematics, an Erdős cardinal, also called a partition cardinal is a certain kind of large cardinal number introduced by Paul Erdős and András Hajnal (1958).

A cardinal $\kappa$ is called $\alpha$ -Erdős if for every function $f:[\kappa ]^{<\omega }\to \{0,1\}$ , there is a set of order type $\alpha$ that is homogeneous for $f$ . In the notation of the partition calculus, $\kappa$ is $\alpha$ -Erdős if

\kappa \rightarrow (\alpha )^{<\omega }

.

Under this definition, any cardinal larger than the least $\alpha$ -Erdős cardinal is $\alpha$ -Erdős.

The existence of zero sharp implies that the constructible universe $L$ satisfies "for every countable ordinal $\alpha$ , there is an $\alpha$ -Erdős cardinal". In fact, for every indiscernible $\kappa$ , $L_{\kappa }$ satisfies "for every ordinal $\alpha$ , there is an $\alpha$ -Erdős cardinal in $\mathrm {Coll} (\omega ,\alpha )$ " (the Lévy collapse to make $\alpha$ countable).

However, the existence of an $\omega _{1}$ -Erdős cardinal implies existence of zero sharp. If $f$ is the satisfaction relation for $L$ (using ordinal parameters), then the existence of zero sharp is equivalent to there being an $\omega _{1}$ -Erdős ordinal with respect to $f$ . Thus, the existence of an $\omega _{1}$ -Erdős cardinal implies that the axiom of constructibility is false.

The least $\omega$ -Erdős cardinal is not weakly compact,^{p. 39.} nor is the least $\omega _{1}$ -Erdős cardinal.^{p. 39}

If $\kappa$ is $\alpha$ -Erdős, then it is $\alpha$ -Erdős in every transitive model satisfying " $\alpha$ is countable."