Elementary equivalences and accessible functors
Category Theory
2020-12-04 v1 Logic
Abstract
We introduce the notion of -equivalence and -embeddings of objects in suitable categories. This notion specializes to -equivalence and -elementary embedding for categories of structures in a language of arity less than , and interacts well with functors and -directed colimits. We recover and extend results of Feferman and Eklof on "local functors" without fixing a language in advance. This is convenient for formalizing Lefschetz's principle in algebraic geometry, which was one of the main applications of the work of Eklof.
Cite
@article{arxiv.1603.02500,
title = {Elementary equivalences and accessible functors},
author = {Tibor Beke and Jiri Rosicky},
journal= {arXiv preprint arXiv:1603.02500},
year = {2020}
}