探索热带微分方程

IF 0.5 4区 数学 Q3 MATHEMATICS Advances in Geometry Pub Date : 2023-10-01 DOI:10.1515/advgeom-2023-0019
Ethan Cotterill, Cristhian Garay, Johana Luviano
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引用次数: 4

摘要

本文的目的有四个方面。一是从零开始发展热带微分代数几何理论;第二部分是介绍微分代数几何的热带基本定理,并说明如何使用它来提取关于给定微分方程组的幂级数解集的组合信息,无论是在阿基米德(复解析)还是在非阿基米德(例如,p -adic)设置中。第三个辅助目标是展示热带微分代数几何如何是半环理论的自然应用,并以此为微分代数几何的价值研究做出贡献。利用这一形式将偏微分代数几何基本定理推广到任意有限多变量形式幂级数环的微分分数域;在这样做的过程中,我们产生了新的非克鲁尔估值例子,它们本身就值得进一步研究。
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Exploring tropical differential equations
Abstract The purpose of this paper is fourfold. The first is to develop the theory of tropical differential algebraic geometry from scratch; the second is to present the tropical fundamental theorem for differential algebraic geometry , and show how it may be used to extract combinatorial information about the set of power series solutions to a given system of differential equations, both in the archimedean (complex analytic) and in the non-Archimedean (e.g., p -adic) setting. A third and subsidiary aim is to show how tropical differential algebraic geometry is a natural application of semiring theory, and in so doing, contribute to the valuative study of differential algebraic geometry. We use this formalism to extend the fundamental theorem of partial differential algebraic geometry to the differential fraction field of the ring of formal power series in arbitrarily (finitely many variables; in doing so we produce new examples of non-Krull valuations that merit further study in their own right.
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来源期刊
Advances in Geometry
Advances in Geometry 数学-数学
CiteScore
1.00
自引率
0.00%
发文量
31
审稿时长
>12 weeks
期刊介绍: Advances in Geometry is a mathematical journal for the publication of original research articles of excellent quality in the area of geometry. Geometry is a field of long standing-tradition and eminent importance. The study of space and spatial patterns is a major mathematical activity; geometric ideas and geometric language permeate all of mathematics.
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