Interpolative fusions II: Preservation results
Abstract
We study interpolative fusion, a method of combining theories and in distinct languages in a "generic" way over a common reduct , to obtain a theory . When each is model-complete, is the model companion of the union . Our goal is to prove preservation results, i.e., to find sufficient conditions under which model-theoretic properties of and are inherited by . We first prove preservation results for quantifier elimination, model-completeness, and related properties. We then apply these tools to show that, under mild hypotheses, including stability of , the property is preserved. We also show that simplicity is preserved under stronger hypotheses on algebraic closure in and . This generalizes many previous results; for example, simplicity of and the random -hypergraph are both non-obvious corollaries. We also address preservation of stability, , and -categoricity, and we describe examples which witness that these results are sharp.
Keywords
Cite
@article{arxiv.2201.03534,
title = {Interpolative fusions II: Preservation results},
author = {Alex Kruckman and Minh Chieu Tran and Erik Walsberg},
journal= {arXiv preprint arXiv:2201.03534},
year = {2022}
}
Comments
Some parts of this paper originally appeared in the first version of the first interpolative fusion paper. arXiv admin note: text overlap with arXiv:1811.06108