On n-dependence
Abstract
In this note we develop and clarify some of the basic combinatorial properties of the new notion of -dependence (for ) recently introduced by Shelah. In the same way as dependence of a theory means its inability to encode a bipartite random graph with a definable edge relation, -dependence corresponds to the inability to encode a random -partite -hypergraph with a definable edge relation. Most importantly, we characterize -dependence by counting -types over finite sets (generalizing Sauer-Shelah lemma and answering a question of Shelah) and in terms of the collapse of random ordered -hypergraph indiscernibles down to order-indiscernibles (which implies that the failure of -dependence is always witnessed by a formula in a single free variable).
Cite
@article{arxiv.1411.0120,
title = {On n-dependence},
author = {Artem Chernikov and Daniel Palacin and Kota Takeuchi},
journal= {arXiv preprint arXiv:1411.0120},
year = {2024}
}
Comments
22 pages; v.2: corrected a small issue in the published version of the paper, in the proof of (3) implies (2) of Theorem 5.4