Analytically generated sharply o-minimal structures
Abstract
We describe a class of sharply o-minimal structures, called analytically generated structures, whose definable sets and their complexity filtration are determined by the collection of definable complex cells. We prove a polynomially effective parameterization theorem using real complex cells for real sets definable in such structures. Following Binyamini--Novikov, this allows us to establish a polynomially effective version of the Yomdin--Gromov lemma on C^r-smooth parameterizations of definable sets, which implies Wilkie's conjecture on polylogarithmic bounds for the amount of algebraic points of bounded height and degree in the transcendental part of a definable set. In addition, we obtain a polynomially effective preparation theorem for definable functions, similar to the subanalytic preparation theorems of Parusinski and of Lion--Rolin.
Cite
@article{arxiv.2604.06144,
title = {Analytically generated sharply o-minimal structures},
author = {Oded Carmon},
journal= {arXiv preprint arXiv:2604.06144},
year = {2026}
}
Comments
18 pages