Internal sizes in $\mu$-abstract elementary classes
Abstract
Working in the context of -abstract elementary classes (-AECs) - or, equivalently, accessible categories with all morphisms monomorphisms - we examine the two natural notions of size that occur, namely cardinality of underlying sets and internal size. The latter, purely category-theoretic, notion generalizes e.g. density character in complete metric spaces and cardinality of orthogonal bases in Hilbert spaces. We consider the relationship between these notions under mild set-theoretic hypotheses, including weakenings of the singular cardinal hypothesis. We also establish preliminary results on the existence and categoricity spectra of -AECs, including specific examples showing dramatic failures of the eventual categoricity conjecture (with categoricity defined using cardinality) in -AECs.
Keywords
Cite
@article{arxiv.1708.06782,
title = {Internal sizes in $\mu$-abstract elementary classes},
author = {Michael Lieberman and Jiří Rosický and Sebastien Vasey},
journal= {arXiv preprint arXiv:1708.06782},
year = {2019}
}
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27 pages