"The Mathematical Foundations of General Relativity Revisited"
written by Jean-Francois Pommaret,
published by Journal of Modern Physics, Vol.4 No.8A, 2013
has been cited by the following article(s):
  • Google Scholar
  • CrossRef
[1] A Mathematical Comment on Lanczos Potential Theory
2019
[2] Generating Compatibility Conditions and General Relativity
2019
[3] Differential Homological Algebra and General Relativity
2019
[4] Generating Compatibility Conditions in Mathematical Physics
2018
[5] From Elasticity to Electromagnetism: Beyond the Mirror
2018
[6] Minkowski, Schwarzschild and Kerr Metrics Revisited
2018
[7] Homological Solution of the Riemann-Lanczos and Weyl-Lanczos Problems in Arbitrary Dimension
2018
[8] Computer Algebra and Lanczos Potential
2018
[9] Algebraic Analysis and Mathematical Physics
2017
[10] Algebraic analysis and general relativity
Pré-publication, Document de travail, 2017
[11] Why Gravitational Waves Cannot Exist
2017
[12] Differential algebra and mathematical physics
2017
[13] A mathematical comment on gravitational waves
2017
[14] Bianchi identities for the Riemann and Weyl tensors
arXiv preprint arXiv:1603.05030, 2016
[15] Airy, Beltrami, Maxwell, Einstein and Lanczos Potentials Revisited
2016
[16] From Thermodynamics to Gauge Theory: The Virial Theorem Revisited
2015
[17] Clausius/Cosserat/Maxwell/Weyl Equations: The Viral Theorem Revisited
arXiv preprint arXiv:1504.04118, 2015
[18] Pure Differential Modules and a Result of Macaulay on Unmixed Polynomial Ideals
arXiv preprint arXiv:1507.07233, 2015
[19] Airy, Beltrami, Maxwell, Morera, Einstein and Lanczos potentials revisited
arXiv preprint arXiv:1512.05982, 2015
[20] Macaulay inverse systems and Cartan-Kahler theorem
arXiv preprint arXiv:1411.7070, 2014
[21] ALGEBRAIC ANALYSIS AND ITS APPLICATIONS
2013
[22] Relative parametrization of linear multidimensional systems
Multidimensional Systems and Signal Processing, 2013
[23] The mathematical foundations of gauge theory revisited
arXiv preprint arXiv:1310.4686, 2013