Guardado en:
Detalles Bibliográficos
Autor principal: Binyamini, Gal
Formato: Preprint
Publicado: 2024
Materias:
Acceso en línea:https://arxiv.org/abs/2405.16963
Etiquetas: Agregar Etiqueta
Sin Etiquetas, Sea el primero en etiquetar este registro!
_version_ 1866910460281880576
author Binyamini, Gal
author_facet Binyamini, Gal
contents We introduce the class of \emph{Log-Noetherian} (LN) functions. These are holomorphic solutions to algebraic differential equations (in several variables) with logarithmic singularities. We prove an upper bound on the number of solutions for systems of LN equations, resolving in particular Khovanskii's conjecture for Noetherian functions. Consequently, we show that the structure ${\mathbb R}_\text{LN}$ generated by LN-functions, as well as its expansion ${\mathbb R}_\text{LN,exp}$, are effectively o-minimal: definable sets in these structures admit effective bounds on their complexity in terms of the complexity of the defining formulas. We show that ${\mathbb R}_\text{LN,exp}$ contains the horizontal sections of regular flat connections with quasiunipotent monodromy over algebraic varieties. It therefore contains the universal covers of Shimura varieties and period maps of polarized variations of $\mathbb Z$-Hodge structures. We also give an effective Pila-Wilkie theorem for ${\mathbb R}_\text{LN,exp}$-definable sets. Thus ${\mathbb R}_\text{LN,exp}$ can be used as an effective variant of ${\mathbb R}_\text{an,exp}$ in the various applications of o-minimality to arithmetic geometry and Hodge theory.
format Preprint
id arxiv_https___arxiv_org_abs_2405_16963
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Log-Noetherian functions
Binyamini, Gal
Algebraic Geometry
Classical Analysis and ODEs
Logic
03C64, 58A17, 14D07, 14Q201
We introduce the class of \emph{Log-Noetherian} (LN) functions. These are holomorphic solutions to algebraic differential equations (in several variables) with logarithmic singularities. We prove an upper bound on the number of solutions for systems of LN equations, resolving in particular Khovanskii's conjecture for Noetherian functions. Consequently, we show that the structure ${\mathbb R}_\text{LN}$ generated by LN-functions, as well as its expansion ${\mathbb R}_\text{LN,exp}$, are effectively o-minimal: definable sets in these structures admit effective bounds on their complexity in terms of the complexity of the defining formulas. We show that ${\mathbb R}_\text{LN,exp}$ contains the horizontal sections of regular flat connections with quasiunipotent monodromy over algebraic varieties. It therefore contains the universal covers of Shimura varieties and period maps of polarized variations of $\mathbb Z$-Hodge structures. We also give an effective Pila-Wilkie theorem for ${\mathbb R}_\text{LN,exp}$-definable sets. Thus ${\mathbb R}_\text{LN,exp}$ can be used as an effective variant of ${\mathbb R}_\text{an,exp}$ in the various applications of o-minimality to arithmetic geometry and Hodge theory.
title Log-Noetherian functions
topic Algebraic Geometry
Classical Analysis and ODEs
Logic
03C64, 58A17, 14D07, 14Q201
url https://arxiv.org/abs/2405.16963