On n-dependent groups and fields III. Multilinear forms and invariant connected components
Logic
2025-04-01 v2 Combinatorics
Group Theory
Abstract
We develop some model theory of multi-linear forms, generalizing Granger in the bi-linear case. In particular, after proving a quantifier elimination result, we show that for an NIP field K, the theory of infinite dimensional non-degenerate alternating n-linear spaces over K is strictly n-dependent; and it is NSOP1 if K is. This relies on a new Composition Lemma for functions of arbitrary arity and NIP relations (which in turn relies on certain higher arity generalizations of Sauer-Shelah lemma). We also study the invariant connected components in n-dependent groups, demonstrating their relative absoluteness in the abelian case.
Cite
@article{arxiv.2412.19921,
title = {On n-dependent groups and fields III. Multilinear forms and invariant connected components},
author = {Artem Chernikov and Nadja Hempel},
journal= {arXiv preprint arXiv:2412.19921},
year = {2025}
}
Comments
v.1: 51 pages, 2 figures. v.2: Minor corrections throughout the text; some references were added