A relativistic theory of the field II: Hamilton's principle and Bianchi's identities
As gravitation and electromagnetism are closely analogous long-range interactions, and the current formulation of gravitation is given in terms of geometry. Thence emerges a relativistic theory of the field by generalization of the general relativity. The derivation presented shows how naturally we...
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Instituto de Investigación de Física
2021
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oai:doaj.org-article:1f8d2c1cb52449668f06fb86e9a3f0772021-11-06T03:07:11ZA relativistic theory of the field II: Hamilton's principle and Bianchi's identities1605-77241728-2977https://doaj.org/article/1f8d2c1cb52449668f06fb86e9a3f0772021-10-01T00:00:00Zhttps://revistasinvestigacion.unmsm.edu.pe/index.php/fisica/article/view/14375https://doaj.org/toc/1605-7724https://doaj.org/toc/1728-2977 As gravitation and electromagnetism are closely analogous long-range interactions, and the current formulation of gravitation is given in terms of geometry. Thence emerges a relativistic theory of the field by generalization of the general relativity. The derivation presented shows how naturally we can extend general relativity theory to a non-symmetric field, and that the field-equations are really the generalizations of the gravitational equations. With curvature tensor and the variational principle, we will deduce the field equations and Bianchi's identities. In consecuense, the field equations will find from Bianchi's identities. Mississippi ValenzuelaInstituto de Investigación de FísicaarticleCurvature Tensorfield equationsBianchi’s identitiesMaxwell’s equations.PhysicsQC1-999ENESRevista de Investigación de Física (2021) |
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DOAJ |
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DOAJ |
| language |
EN ES |
| topic |
Curvature Tensor field equations Bianchi’s identities Maxwell’s equations. Physics QC1-999 |
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Curvature Tensor field equations Bianchi’s identities Maxwell’s equations. Physics QC1-999 Mississippi Valenzuela A relativistic theory of the field II: Hamilton's principle and Bianchi's identities |
| description |
As gravitation and electromagnetism are closely analogous long-range interactions, and the current formulation of gravitation is given in terms of geometry. Thence emerges a relativistic theory of the field by generalization of the general relativity. The derivation presented shows how naturally we can extend general relativity theory to a non-symmetric field, and that the field-equations are really the generalizations of the gravitational equations. With curvature tensor and the variational principle, we will deduce the field equations and Bianchi's identities. In consecuense, the field equations will find from Bianchi's identities.
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| format |
article |
| author |
Mississippi Valenzuela |
| author_facet |
Mississippi Valenzuela |
| author_sort |
Mississippi Valenzuela |
| title |
A relativistic theory of the field II: Hamilton's principle and Bianchi's identities |
| title_short |
A relativistic theory of the field II: Hamilton's principle and Bianchi's identities |
| title_full |
A relativistic theory of the field II: Hamilton's principle and Bianchi's identities |
| title_fullStr |
A relativistic theory of the field II: Hamilton's principle and Bianchi's identities |
| title_full_unstemmed |
A relativistic theory of the field II: Hamilton's principle and Bianchi's identities |
| title_sort |
relativistic theory of the field ii: hamilton's principle and bianchi's identities |
| publisher |
Instituto de Investigación de Física |
| publishDate |
2021 |
| url |
https://doaj.org/article/1f8d2c1cb52449668f06fb86e9a3f077 |
| work_keys_str_mv |
AT mississippivalenzuela arelativistictheoryofthefieldiihamiltonsprincipleandbianchisidentities AT mississippivalenzuela relativistictheoryofthefieldiihamiltonsprincipleandbianchisidentities |
| _version_ |
1718443964906864640 |