Abstract
We introduce various colouring principles which generalise the so-called onto mapping principle of Sierpiński to larger cardinals and general ideals. We prove that these principles capture the notion of an Ulam matrix and allow to characterise large cardinals, most notably weakly compact and ineffable cardinals. We also develop the basic theory of these colouring principles, connecting them to the classical negative square bracket partition relations, proving pumping-up theorems, and deciding various instances of theirs. We also demonstrate that our principles provide a uniform way of obtaining non-saturation results for ideals satisfying a property we call subnormality in contexts where Ulam matrices might not be available.
Original language | English |
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Article number | 108287 |
Journal | Topology and its Applications |
Volume | 323 |
DOIs | |
State | Published - 1 Jan 2023 |
Bibliographical note
Publisher Copyright:© 2022 Elsevier B.V.
Funding
The first author is supported by the Israel Science Foundation (grant agreement 2066/18 ). The second author is partially supported by the European Research Council (grant agreement ERC-2018-StG 802756 ) and by the Israel Science Foundation (grant agreement 2066/18 ).
Funders | Funder number |
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Horizon 2020 Framework Programme | 802756 |
European Commission | |
Israel Science Foundation | 2066/18 |
Keywords
- Ineffable cardinal
- Negative partition relation
- Partition relations
- Saturated ideals
- Sierpinski's onto mapping
- Ulam matrix
- Weakly compact cardinal