Supercompact cardinals, elementary embeddings and fixed points
Copyright policy )Supercompact cardinals, elementary embeddings and fixed points
Supercompactness is usually defined in terms of the existence of certain ultrafilters. By the well-known procedure of taking ultrapowers of V (the universe of sets) and transitive collapses, one obtains transitive inner models of V and corresponding elementary embeddings from V into these inner models. These embeddings have been studied extensively (see, e.g. [3] or [4]). We investigate the action of these embeddings on cardinals. In particular, we establish a characterization, based upon cofinality, of which cardinals are fixed by these embeddings.
- Union College United States
Large cardinals, normal ultrafilter, Ordinal and cardinal numbers, elementary embedding, supercompact cardinal
Large cardinals, normal ultrafilter, Ordinal and cardinal numbers, elementary embedding, supercompact cardinal
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