Some size and structure theorems for ultrapowers

In this thesis we study the mapping D → A[sup I]/D, between ultrafilters and models, given by the ultrapower construction. Under this mapping homomorphisms of ultrapowers induce elementary embeddings of ultrapowers. Using these embeddings we investigate the dependence of the structure of an ultrapow...

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Main Author: Jorgensen, Murray Allan
Language:English
Published: University of British Columbia 2011
Online Access:http://hdl.handle.net/2429/32660
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spelling ndltd-UBC-oai-circle.library.ubc.ca-2429-326602018-01-05T17:46:47Z Some size and structure theorems for ultrapowers Jorgensen, Murray Allan In this thesis we study the mapping D → A[sup I]/D, between ultrafilters and models, given by the ultrapower construction. Under this mapping homomorphisms of ultrapowers induce elementary embeddings of ultrapowers. Using these embeddings we investigate the dependence of the structure of an ultrapower A[sup I]/D on the cardinality of the index set I. With each ultrafilter D we associate a set of cardinals a(D) which we term the shadow of D. We investigate the form of the sets a(D). It is shown that if σ(D) has "gaps" then isomorphisms arise between ultrapowers of different index sizes. In terms of σ(D) we prove new results on the properties of the set of homomorphic images of an ultrafilter. Finally we introduce a new class of "quasicomplete" ultrafilters and prove several results about ultrapowers constructed using these. Two results which can be mentioned here are the following: Let α be a regular cardinal. We establish necessary and sufficient conditions on D (i) for the cardinality of α to be raised in the passage to α[sup I]/D. (ii) for the confinality of α[sup I]/D (regarded as an ordered set) to be greater than α⁺. Some of the results of this thesis depend on assumption of the Generalised Continuum Hypothesis. The result (i) above is a case in point. Science, Faculty of Mathematics, Department of Graduate 2011-03-21T19:52:13Z 2011-03-21T19:52:13Z 1971 Text Thesis/Dissertation http://hdl.handle.net/2429/32660 eng For non-commercial purposes only, such as research, private study and education. Additional conditions apply, see Terms of Use https://open.library.ubc.ca/terms_of_use. University of British Columbia
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language English
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description In this thesis we study the mapping D → A[sup I]/D, between ultrafilters and models, given by the ultrapower construction. Under this mapping homomorphisms of ultrapowers induce elementary embeddings of ultrapowers. Using these embeddings we investigate the dependence of the structure of an ultrapower A[sup I]/D on the cardinality of the index set I. With each ultrafilter D we associate a set of cardinals a(D) which we term the shadow of D. We investigate the form of the sets a(D). It is shown that if σ(D) has "gaps" then isomorphisms arise between ultrapowers of different index sizes. In terms of σ(D) we prove new results on the properties of the set of homomorphic images of an ultrafilter. Finally we introduce a new class of "quasicomplete" ultrafilters and prove several results about ultrapowers constructed using these. Two results which can be mentioned here are the following: Let α be a regular cardinal. We establish necessary and sufficient conditions on D (i) for the cardinality of α to be raised in the passage to α[sup I]/D. (ii) for the confinality of α[sup I]/D (regarded as an ordered set) to be greater than α⁺. Some of the results of this thesis depend on assumption of the Generalised Continuum Hypothesis. The result (i) above is a case in point. === Science, Faculty of === Mathematics, Department of === Graduate
author Jorgensen, Murray Allan
spellingShingle Jorgensen, Murray Allan
Some size and structure theorems for ultrapowers
author_facet Jorgensen, Murray Allan
author_sort Jorgensen, Murray Allan
title Some size and structure theorems for ultrapowers
title_short Some size and structure theorems for ultrapowers
title_full Some size and structure theorems for ultrapowers
title_fullStr Some size and structure theorems for ultrapowers
title_full_unstemmed Some size and structure theorems for ultrapowers
title_sort some size and structure theorems for ultrapowers
publisher University of British Columbia
publishDate 2011
url http://hdl.handle.net/2429/32660
work_keys_str_mv AT jorgensenmurrayallan somesizeandstructuretheoremsforultrapowers
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