Diagonal intersection

Diagonal intersection is a term used in mathematics, especially in set theory.

If $\displaystyle\delta$ is an ordinal number and $\displaystyle\langle X_\alpha \mid \alpha<\delta\rangle$ is a sequence of subsets of $\displaystyle\delta$ , then the diagonal intersection, denoted by

\displaystyle\Delta_{\alpha<\delta} X_\alpha,

is defined to be

\displaystyle\{\beta<\delta\mid\beta\in \bigcap_{\alpha<\beta} X_\alpha\}.

That is, an ordinal $\displaystyle\beta$ is in the diagonal intersection $\displaystyle\Delta_{\alpha<\delta} X_\alpha$ if and only if it is contained in the first $\displaystyle\beta$ members of the sequence. This is the same as

\displaystyle\bigcap_{\alpha < \delta} ( [0, \alpha] \cup X_\alpha ),

where the closed interval from 0 to $\displaystyle\alpha$ is used to avoid restricting the range of the intersection.

References

Thomas Jech, Set Theory, The Third Millennium Edition, Springer-Verlag Berlin Heidelberg New York, 2003, page 92.
Akihiro Kanamori, The Higher Infinite, Second Edition, Springer-Verlag Berlin Heidelberg, 2009, page 2.

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Diagonal intersection

See also

References