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Conservativity of ultrafilters over subsystems of second order arithmetic

Antonio Montalbán & Richard A. Shore

Journal of Symbolic Logic 83 (2):740-765 (2018)

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Non-principal ultrafilters, program extraction and higher-order reverse mathematics.Alexander P. Kreuzer - 2012 - Journal of Mathematical Logic 12 (1):1250002-.details We investigate the strength of the existence of a non-principal ultrafilter over fragments of higher-order arithmetic. Let [Formula: see text] be the statement that a non-principal ultrafilter on ℕ exists and let [Formula: see text] be the higher-order extension of ACA0. We show that [Formula: see text] is [Formula: see text]-conservative over [Formula: see text] and thus that [Formula: see text] is conservative over PA. Moreover, we provide a program extraction method and show that from a proof of a strictly (...) Download Export citation Bookmark 4 citations
Ultrafilters in reverse mathematics.Henry Towsner - 2014 - Journal of Mathematical Logic 14 (1):1450001.details We extend theories of reverse mathematics by a non-principal ultrafilter, and show that these are conservative extensions of the usual theories ACA0, ATR0, and [Formula: see text]. Download Export citation Bookmark 2 citations
An effective proof that open sets are Ramsey.Jeremy Avigad - 1998 - Archive for Mathematical Logic 37 (4):235-240.details Solovay has shown that if $\cal{O}$ is an open subset of $P(\omega)$ with code $S$ and no infinite set avoids $\cal{O}$ , then there is an infinite set hyperarithmetic in $S$ that lands in $\cal{O}$ . We provide a direct proof of this theorem that is easily formalizable in $ATR_0$. Download Export citation Bookmark 8 citations

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