Algebraic independence and linear difference equations

IF 2.5 1区数学 Q1 MATHEMATICS Journal of the European Mathematical Society Pub Date : 2020-10-19 DOI:10.4171/jems/1316

B. Adamczewski, T. Dreyfus, C. Hardouin, M. Wibmer

引用次数: 6

Abstract

We consider pairs of automorphisms $(\phi,\sigma)$ acting on fields of Laurent or Puiseux series: pairs of shift operators $(\phi\colon x\mapsto x+h_1, \sigma\colon x\mapsto x+h_2)$, of $q$-difference operators $(\phi\colon x\mapsto q_1x,\ \sigma\colon x\mapsto q_2x)$, and of Mahler operators $(\phi\colon x\mapsto x^{p_1},\ \sigma\colon x\mapsto x^{p_2})$. Given a solution $f$ to a linear $\phi$-equation and a solution $g$ to a linear $\sigma$-equation, both transcendental, we show that $f$ and $g$ are algebraically independent over the field of rational functions, assuming that the corresponding parameters are sufficiently independent. As a consequence, we settle a conjecture about Mahler functions put forward by Loxton and van der Poorten in 1987. We also give an application to the algebraic independence of $q$-hypergeometric functions. Our approach provides a general strategy to study this kind of question and is based on a suitable Galois theory: the $\sigma$-Galois theory of linear $\phi$-equations.

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代数无关性与线性差分方程

我们考虑作用于Laurent或Puiseux级数域中的自同构对$(\phi,\sigma)$:位移算子对$(\phi\colon x\mapsto x+h_1, \sigma\colon x\mapsto x+h_2)$、$q$ -差分算子对$(\phi\colon x\mapsto q_1x,\ \sigma\colon x\mapsto q_2x)$和Mahler算子对$(\phi\colon x\mapsto x^{p_1},\ \sigma\colon x\mapsto x^{p_2})$。给出一个线性$\phi$ -方程的解$f$和一个线性$\sigma$ -方程的解$g$，两者都是超越的，我们证明$f$和$g$在有理函数域上是代数独立的，假设相应的参数是足够独立的。因此，我们解决了Loxton和van der Poorten在1987年提出的关于马勒函数的猜想。给出了$q$ -超几何函数的代数无关性的一个应用。我们的方法提供了一种研究这类问题的一般策略，并基于一种合适的伽罗瓦理论:线性$\phi$方程的$\sigma$ -伽罗瓦理论。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of the European Mathematical Society 数学-数学

CiteScore

4.50

自引率

0.00%

发文量

103

审稿时长

6-12 weeks

期刊介绍： The Journal of the European Mathematical Society (JEMS) is the official journal of the EMS. The Society, founded in 1990, works at promoting joint scientific efforts between the many different structures that characterize European mathematics. JEMS will publish research articles in all active areas of pure and applied mathematics. These will be selected by a distinguished, international board of editors for their outstanding quality and interest, according to the highest international standards. Occasionally, substantial survey papers on topics of exceptional interest will also be published. Starting in 1999, the Journal was published by Springer-Verlag until the end of 2003. Since 2004 it is published by the EMS Publishing House. The first Editor-in-Chief of the Journal was J. Jost, succeeded by H. Brezis in 2004. The Journal of the European Mathematical Society is covered in: Mathematical Reviews (MR), Current Mathematical Publications (CMP), MathSciNet, Zentralblatt für Mathematik, Zentralblatt MATH Database, Science Citation Index (SCI), Science Citation Index Expanded (SCIE), CompuMath Citation Index (CMCI), Current Contents/Physical, Chemical & Earth Sciences (CC/PC&ES), ISI Alerting Services, Journal Citation Reports/Science Edition, Web of Science.

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