卡坦几何微积分中的半自主射流和诱导模块

Jan Slovák, Vladimír Souček
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引用次数: 0

摘要

费利克斯-克莱因(Felix Klein)于 1872 年提出了著名的 "埃朗根方案"(Erlangen Programme),将固定对称群作为几何分析的核心要素,将所选对称视为所有对象和工具的内在不变性。上世纪初,埃利-卡坦(Elie Cartan)对这一思想进行了本质上的拓展,我们可以将(曲线)几何视为某些(平面)克莱因模型的建模。本短文旨在仔细解释近几十年来建立的基本概念和代数工具。我们将重点放在同质束的截面射流与相关诱导模块之间的直接联系上,使我们能够用纯代数术语理解不变线性微分运算器的整体结构。这使我们能够将概念和程序的基本部分扩展到弯曲情况。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Semiholonomic jets and induced modules in Cartan geometry calculus
The famous Erlangen Programme was coined by Felix Klein in 1872 as an algebraic approach allowing to incorporate fixed symmetry groups as the core ingredient for geometric analysis, seeing the chosen symmetries as intrinsic invariance of all objects and tools. This idea was broadened essentially by Elie Cartan in the beginning of the last century, and we may consider (curved) geometries as modelled over certain (flat) Klein's models. The aim of this short survey is to explain carefully the basic concepts and algebraic tools built over several recent decades. We focus on the direct link between the jets of sections of homogeneous bundles and the associated induced modules, allowing us to understand the overall structure of invariant linear differential operators in purely algebraic terms. This allows us to extend essential parts of the concepts and procedures to the curved cases.
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