On idempotent ultrafilters in higher-order reverse mathematics

On idempotent ultrafilters in higher-order reverse mathematics

We analyze the strength of the existence of idempotent ultrafilters in higher-order reverse mathematics. Let (Uidem) be the statement that an idempotent ultrafilter on the natural numbers exists. We show that over ACA_0^w, the higher-order extension of ACA_0, the statement (Uidem) implies the iterat...

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Veröffentlicht in:arXiv.org 2013-02
1. Verfasser: Kreuzer, Alexander P
Format: Artikel
Sprache:eng
Schlagworte:
Mathematical analysis
Mathematics - Logic
Number theory
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Zusammenfassung:We analyze the strength of the existence of idempotent ultrafilters in higher-order reverse mathematics. Let (Uidem) be the statement that an idempotent ultrafilter on the natural numbers exists. We show that over ACA_0^w, the higher-order extension of ACA_0, the statement (Uidem) implies the iterated Hindman's theorem (IHT), and we show that ACA_0^w + (Uidem) is Pi^1_2-conservative over ACA_0^w + IHT and thus over ACA_0^+.
ISSN:2331-8422
DOI:10.48550/arxiv.1208.1424