On n-dependent groups and fields II
Abstract
We continue the study of -dependent groups, fields and related structures, largely motivated by the conjecture that every -dependent field is dependent. We provide evidence towards this conjecture by showing that every infinite -dependent valued field of positive characteristic is henselian, obtaining a variant of Shelah's Henselianity Conjecture in this case and generalizing a recent result of Johnson for dependent fields. Additionally, we prove a result on intersections of type-definable connected components over generic sets of parameters in -dependent groups, generalizing Shelah's absoluteness of in dependent theories and relative absoluteness of in -dependent theories. In an effort to clarify the scope of this conjecture, we provide new examples of strictly -dependent fields with additional structure, showing that Granger's examples of non-degenerate bilinear forms over dependent fields are -dependent. Along the way, we obtain some purely model-theoretic results of independent interest: we show that -dependence is witnessed by formulas with all but one variable singletons; provide a type-counting criterion for -dependence and use it to deduce -dependence for compositions of dependent relations with arbitrary binary functions (the Composition Lemma); and show that an expansion of a geometric theory by a generic predicate is dependent if and only if it is -dependent for some , if and only if the algebraic closure in is disintegrated. An appendix by Martin Bays provides an explicit isomorphism in the Kaplan-Scanlon-Wagner theorem.
Keywords
Cite
@article{arxiv.1912.02385,
title = {On n-dependent groups and fields II},
author = {Artem Chernikov and Nadja Hempel},
journal= {arXiv preprint arXiv:1912.02385},
year = {2021}
}
Comments
v.3: 52 pages; the presentation was thoroughly revised; the order of the sections was changed; many proofs were expanded with additional details and clarifications; minor corrections throughout the article; accepted to Forum of Mathematics, Sigma