Weyl connection, non-Abelian gauge field, and torsion

B. M. BARBASHOV; A. B. Pestov

doi:10.1007/bf02068742

journal article Sep 01, 1995

Weyl connection, non-Abelian gauge field, and torsion

B. M. BARBASHOV A. B. Pestov

Theoretical and Mathematical Physics Vol. 104 No. 3 pp. 1104-1107 · Springer Science and Business Media LLC

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References

7

[1]

H. Weyl,Sitzungsber. Berl. Acad., 465 (1918).

[2]

S. W. Hawking and G. F. R. Ellis,The Large-Scale Structure of Spacetime, Cambridge University Press, Cambridge (1973). 10.1017/cbo9780511524646

[3]

H. Weyl,Space—Time—Matter, Dover Publications: INC (1922).

[4]

J. Schouten,Ricci-Calculus, Berlin (1954). 10.1007/978-3-662-12927-2

[5]

A. A. Slavnov and L. D. Faddeev,Gauge Fields, Introduction to Quantum Theory (Frontiers in Physics, Vol. 50), Reading, Mass. (1980).

[6]

B. M. Barbashov, A. A. Leonovoch, and A. B. Pestov,Yad. Fiz.,38, No. I(7) (1983).

[7]

General relativity with spin and torsion: Foundations and prospects

Friedrich W. Hehl, Paul von der Heyde, G. David Kerlick et al.

Reviews of Modern Physics 1976 10.1103/revmodphys.48.393

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Details

Published: Sep 01, 1995
Vol/Issue: 104(3)
Pages: 1104-1107
License: View

Authors

B

B. M. BARBASHOV

Joint Institute for Nuclear Research, Dubna, 141980, Moscow region, Russia

A

A. B. Pestov

Cite This Article

B. M. BARBASHOV, A. B. Pestov (1995). Weyl connection, non-Abelian gauge field, and torsion. Theoretical and Mathematical Physics, 104(3), 1104-1107. https://doi.org/10.1007/bf02068742

Weyl connection, non-Abelian gauge field, and torsion

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