Fat subsets of P kappa (lambda)
For a subset of a cardinal greater than ω1, fatness is strictly stronger than stationarity and strictly weaker than being closed unbounded. For many regular cardinals, being fat is a sufficient condition for having a closed unbounded subset in some generic extension. In this work we characterize fat...
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ndltd-bu.edu-oai-open.bu.edu-2144-140992019-12-07T03:02:57Z Fat subsets of P kappa (lambda) Zaigralin, Ivan Theoretical mathematics For a subset of a cardinal greater than ω1, fatness is strictly stronger than stationarity and strictly weaker than being closed unbounded. For many regular cardinals, being fat is a sufficient condition for having a closed unbounded subset in some generic extension. In this work we characterize fatness for subsets of Pκ(λ). We prove that for many regular cardinals κ and λ, a fat subset of Pκ(λ) obtains a closed unbounded subset in a cardinal-preserving generic extension. Additionally, we work out the conflict produced by two different definitions of fat subset of a cardinal, and introduce a novel (not model-theoretic) proof technique for adding a closed unbounded subset to a fat subset of a cardinal. 2016-01-27T15:07:06Z 2016-01-27T15:07:06Z 2013 2016-01-22T18:53:46Z Thesis/Dissertation https://hdl.handle.net/2144/14099 en_US |
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NDLTD |
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en_US |
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NDLTD |
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Theoretical mathematics |
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Theoretical mathematics Zaigralin, Ivan Fat subsets of P kappa (lambda) |
| description |
For a subset of a cardinal greater than ω1, fatness is strictly stronger than stationarity and strictly weaker than being closed unbounded. For many regular cardinals, being fat is a sufficient condition for having a closed unbounded subset in some generic extension. In this work we characterize fatness for subsets of Pκ(λ). We prove that for many regular cardinals κ and λ, a fat subset of Pκ(λ) obtains a closed unbounded subset in a cardinal-preserving generic extension. Additionally, we work out the conflict produced by two different definitions of fat subset of a cardinal, and introduce a novel (not model-theoretic) proof technique for adding a closed unbounded subset to a fat subset of a cardinal. |
| author |
Zaigralin, Ivan |
| author_facet |
Zaigralin, Ivan |
| author_sort |
Zaigralin, Ivan |
| title |
Fat subsets of P kappa (lambda) |
| title_short |
Fat subsets of P kappa (lambda) |
| title_full |
Fat subsets of P kappa (lambda) |
| title_fullStr |
Fat subsets of P kappa (lambda) |
| title_full_unstemmed |
Fat subsets of P kappa (lambda) |
| title_sort |
fat subsets of p kappa (lambda) |
| publishDate |
2016 |
| url |
https://hdl.handle.net/2144/14099 |
| work_keys_str_mv |
AT zaigralinivan fatsubsetsofpkappalambda |
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1719302058940563456 |