Oliver Deiser scite author profile

Oliver Deiser

4Publications

33Citation Statements Received

12Citation Statements Given

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Affiliations

Technical University of Munich, Freie Universität Berlin, Heinz Nixdorf Stiftung

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Canonical functions, non-regular ultrafilters and Ulam's problem on ω₁

Deiser¹,

Donder

2003

J. symb. log.

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Our main results are:Theorem 1. Con(ZFC + “every function f: ω1 → ω1 is dominated by a canonical function”) implies Con(ZFC + “there exists an inaccessible limit of measurable cardinals”). [In fact equiconsistency holds.]Theorem 3. Con(ZFC + “there exists a non-regular uniform ultrafilter on ω1”) implies Con(ZFC + “there exists an inaccessible stationary limit of measurable cardinals”).Theorem 5. Con (ZFC + “there exists an ω1-sequence of ω1-complete uniform filters on ω1 s.t. every A ⊆ ω1 is measurable w.r.t. a filter in (Ulam property)”) implies Con(ZFC + “there exists an inaccessible stationary limit of measurable cardinals”).We start with a discussion of the canonical functions and look at some combinatorial principles. Assuming the domination property of Theorem 1, we use the Ketonen diagram to show that ω2V is a limit of measurable cardinals in Jensen's core model KMO for measures of order zero. Using related arguments we show that ω2V is a stationary limit of measurable cardinals in KMO, if there exists a weakly normal ultrafilter on ω1. The proof yields some other results, e.g., on the consistency strength of weak*-saturated filters on ω1, which are of interest in view of the classical Ulam problem.

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On the Development of the Notion of a Cardinal Number

Deiser

2010

History and Philosophy of Logic

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Einführung in die Mengenlehre

Deiser¹

2010

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Knowledge Transformation Between Secondary School and University Mathematics

Deiser

Reiss

2014

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Oliver Deiser

Canonical functions, non-regular ultrafilters and Ulam's problem on ω₁

On the Development of the Notion of a Cardinal Number

Einführung in die Mengenlehre

Knowledge Transformation Between Secondary School and University Mathematics

Contact Info

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Resources

About

Oliver Deiser

Canonical functions, non-regular ultrafilters and Ulam's problem on ω1

On the Development of the Notion of a Cardinal Number

Einführung in die Mengenlehre

Knowledge Transformation Between Secondary School and University Mathematics

Contact Info

Product

Resources

About

Canonical functions, non-regular ultrafilters and Ulam's problem on ω₁