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The Mathematical Foundations of General Relativity Revisited
The Mathematical Foundations of General Relativity Revisited
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The purpose of this paper is to present for the first time an elementary summary of a few recent results obtained through the application of the formal theory of partial differential equations and Lie pseudogroups in order to revisit the mathematical foundations of general relativity. Other engineering examples (control theory, elasticity theory, electromagnetism) will also be considered in order to illustrate the three fundamental results that we shall provide successively. 1) VESSIOT VERSUS CARTAN: The quadratic terms appearing in the “Riemann tensor” according to the “Vessiot structure equations” must not be identified with the quadratic terms appearing in the well known “Cartan structure equations” for Lie groups. In particular, “curvature + torsion” (Cartan) must not be considered as a generalization of “curvature alone” (Vessiot). 2) JANET VERSUS SPENCER: The “Ricci tensor” only depends on the nonlinear transformations (called “elations” by Cartan in 1922) that describe the “difference” existing between the Weyl group (10 parameters of the Poincaré subgroup + 1 dilatation) and the conformal group of space-time (15 parameters). It can be defined without using the indices leading to the standard contraction or trace of the Riemann tensor. Meanwhile, we shall obtain the number of components of the Riemann and Weyl tensors without any combinatoric argument on the exchange of indices. Accordingly and contrary to the “Janet sequence”, the “Spencer sequence” for the conformal Killing system and its formal adjoint fully describe the Cosserat equations, Maxwell equations and Weyl equations but General Relativity is not coherent with this result. 3) ALGEBRA VERSUS GEOMETRY: Using the powerful methods of “Algebraic Analysis”, that is a mixture of homological agebra and differential geometry, we shall prove that, contrary to other equations of physics (Cauchy equations, Cosserat equations, Maxwell equations), the Einstein equations cannot be “parametrized”, that is the g
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| 篇名 | The Mathematical Foundations of General Relativity Revisited | ||
| 来源期刊 | 现代物理(英文) | 学科 | 数学 |
| 关键词 | General Relativity Riemann TENSOR Weyl TENSOR Ricci TENSOR Einstein Equations LIE Groups LIE Pseudogroups DIFFERENTIAL SEQUENCE SPENCER Operator JANET SEQUENCE SPENCER SEQUENCE DIFFERENTIAL Module Homological Algebra Extension Modules Split Exact SEQUENCE | ||
| 年,卷(期) | 2013,(8) | 所属期刊栏目 | |
| 研究方向 | 页码范围 | 223-239 | |
| 页数 | 17页 | 分类号 | O1 |
| 字数 | 语种 | ||
| DOI | |||
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General
Relativity
Riemann
TENSOR
Weyl
TENSOR
Ricci
TENSOR
Einstein
Equations
LIE
Groups
LIE
Pseudogroups
DIFFERENTIAL
SEQUENCE
SPENCER
Operator
JANET
SEQUENCE
SPENCER
SEQUENCE
DIFFERENTIAL
Module
Homological
Algebra
Extension
Modules
Split
Exact
SEQUENCE
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现代物理(英文)
主办单位:
美国科研出版社
出版周期:
月刊
ISSN:
2153-1196
CN:
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出版地:
武汉市江夏区汤逊湖北路38号光谷总部空间
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1826
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