http://debianws.lexgopc.com/wiki143/index.php?action=history&feed=atom&title=Diagonal_intersectionDiagonal intersection - Revision history2026-05-04T19:41:56ZRevision history for this page on the wikiMediaWiki 1.43.1http://debianws.lexgopc.com/wiki143/index.php?title=Diagonal_intersection&diff=1248681&oldid=previmported>Jlwoodwa: /* References */ {{refbegin}}2024-03-11T20:30:27Z<p><span class="autocomment">References: </span> {{<a href="/wiki143/index.php?title=Template:Refbegin" title="Template:Refbegin">refbegin</a>}}</p>
<p><b>New page</b></p><div>'''Diagonal intersection''' is a term used in [[mathematics]], especially in [[set theory]].<br />
<br />
If <math>\displaystyle\delta</math> is an [[ordinal number]] and <math>\displaystyle\langle X_\alpha \mid \alpha<\delta\rangle</math> <br />
is a [[sequence]] of subsets of <math>\displaystyle\delta</math>, then the ''diagonal intersection'', denoted by<br />
<br />
:<math>\displaystyle\Delta_{\alpha<\delta} X_\alpha,</math><br />
<br />
is defined to be <br />
<br />
:<math>\displaystyle\{\beta<\delta\mid\beta\in \bigcap_{\alpha<\beta} X_\alpha\}.</math><br />
<br />
That is, an [[ordinal number|ordinal]] <math>\displaystyle\beta</math> is in the diagonal intersection <math>\displaystyle\Delta_{\alpha<\delta} X_\alpha</math> if and only if it is contained in the first <math>\displaystyle\beta</math> members of the sequence. This is the same as <br />
<br />
:<math>\displaystyle\bigcap_{\alpha < \delta} ( [0, \alpha] \cup X_\alpha ),</math><br />
<br />
where the closed interval from 0 to <math>\displaystyle\alpha</math> is used to<br />
avoid restricting the range of the intersection.<br />
<br />
==Relationship to the Nonstationary Ideal==<br />
<br />
For κ an uncountable regular cardinal, in the [[Boolean algebra]] ''P''(κ)/''I<sub>NS</sub>'' where ''I<sub>NS</sub>'' is the nonstationary ideal (the ideal dual to the [[club filter]]), the diagonal intersection of a κ-sized family of subsets of κ does not depend on the enumeration. That is to say, if one enumeration gives the diagonal intersection ''X<sub>1</sub>'' and another gives ''X<sub>2</sub>'', then there is a club ''C'' so that ''X<sub>1</sub>'' ∩ ''C'' = ''X<sub>2</sub>'' ∩ ''C''.<br />
<br />
A set ''Y'' is a lower bound of ''F'' in ''P''(κ)/''I<sub>NS</sub>'' only when for any ''S'' ∈ ''F'' there is a club ''C'' so that ''Y'' ∩ ''C'' ⊆ ''S''. The diagonal intersection Δ''F'' of ''F'' plays the role of [[infimum|greatest lower bound]] of ''F'', meaning that ''Y'' is a lower bound of ''F'' if and only if there is a club ''C'' so that ''Y'' ∩ ''C'' ⊆ Δ''F''.<br />
<br />
This makes the algebra ''P''(κ)/''I<sub>NS</sub>'' a κ<sup>+</sup>-complete Boolean algebra, when equipped with diagonal intersections.<br />
<br />
==See also==<br />
<br />
* [[Club set]]<br />
* [[Fodor's lemma]]<br />
<br />
==References==<br />
{{reflist}}<br />
{{refbegin}}<br />
* [[Thomas Jech]], ''Set Theory'', The Third Millennium Edition, Springer-Verlag Berlin Heidelberg New York, 2003, page 92, 93.<br />
* [[Akihiro Kanamori]], ''[[The Higher Infinite]]'', Second Edition, Springer-Verlag Berlin Heidelberg, 2009, page 2.<br />
{{refend}}<br />
{{PlanetMath attribution|id=3233|title=diagonal intersection}}<br />
<br />
{{Mathematical logic}}<br />
{{Set theory}}<br />
<br />
[[Category:Ordinal numbers]]<br />
[[Category:Set theory]]<br />
<br />
<br />
{{mathlogic-stub}}</div>imported>Jlwoodwa