Geometry of the submanifolds of \(SEX_ n\). I: The C-nonholonomic frame of reference
From MaRDI portal
Publication:912398
DOI10.1007/BF00669999zbMath0698.53008OpenAlexW2080150912MaRDI QIDQ912398
Keum Sook So, Kyung Tae Chung, Jong Woo Lee
Publication date: 1989
Published in: International Journal of Theoretical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf00669999
unified field theoryC-nonholonomic frame of referenceEinstein's connectionSE manifoldsemisymmetric condition
Kaluza-Klein and other higher-dimensional theories (83E15) Applications of local differential geometry to the sciences (53B50) Other connections (53B15)
Related Items (4)
Geometry of the submanifolds of \(SEX_ n\). II: The generalized fundamental equations for the hypersubmanifold of \(SEX_ n\) ⋮ Field equations of \(SK(k)\)-manifold \(X_ n\) ⋮ Generalized fundamental equations on the submanifolds of a manifold \(ESX_ n\) ⋮ Geometry of the submanifolds of \(ESX_ n\). III: Parallelism in \(ESX_ n\) and its submanifolds
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Some recurrence relations and Einstein's connection in 2-dimensional unified field theory
- A study on the relations of two \(n\)-dimensional unified field theories
- Curvature tensors and unified field equations on \(SEX_ n\)
- Three- and five-dimensional considerations of the geometry of Einstein's *g-unified field theory
- \(n\)-dimensional representations of the unified field tensor \(^*g^{ik}\)
- Conformal change in einstein’s $${}^ * g^{\lambda \nu - } $$ -unified field theory. — I-unified field theory. — I
- Einstein ’s connection in terms of* g λμ
This page was built for publication: Geometry of the submanifolds of \(SEX_ n\). I: The C-nonholonomic frame of reference
