Nonstandard polynomials: algebraic properties and elementary equivalence
Abstract
We solve the first-order classification problem for rings of polynomials and Laurent polynomials with coefficients in an infinite field or the ring of integers , that is, we describe the algebraic structure of all rings that are first-order equivalent to . Our approach is based on a new and very powerful method of regular bi-interpretations, or more precisely, regular invertible interpretations. Namely, we prove that and are regularly bi-interpretable with the list superstructure of , which is equivalent to regular bi-interpretation with the superstructure of hereditary finite sets over . The expressive power of is the same as that of the weak second-order logic over . Hence, the first-order logic in or is equivalent to the weak second-order logic in (following the terminology of Kharlampovich, Myasnikov, and Sohrabi [16], such structures are necessarily rich), which allows one to describe the algebraic structure of all rings with . In fact, these rings are precisely the ``non-standard'' models of , like in non-standard arithmetic or non-standard analysis. This is particularly straightforward when is regularly bi-interpretable with , in this case the ring is also bi-interpretable with . Using our approach, we describe various, sometimes rather surprising, algebraic and model-theoretic properties of the non-standard models of .
Cite
@article{arxiv.2409.14467,
title = {Nonstandard polynomials: algebraic properties and elementary equivalence},
author = {Alexei Myasnikov and Andrey Nikolaev},
journal= {arXiv preprint arXiv:2409.14467},
year = {2024}
}
Comments
45 pages