Abstract:
The equivariant inverse problem for Yang-Mills-type Euler-Lagrange expressions is solved in the affirmative. This leads to a proof of the uniqueness of the Yang-Mills equations. © 1989 American Institute of Physics.
Referencias:
- Anderson, I.M., (1984) Ann. Math., 120, p. 329
- We denote [formula omitted] where [formula omitted] where [formula omitted] are the Levi-Civita permutation symbols. In Eq. (7), [formula omitted] is the charge-current vector; Horndeski, G.W., (1981) Arch. Rat. Mech. Anal., 75, p. 229
- Noriega, R.J., Schifini, C.G., (1988) Gen. Relativ. Gravit., 20, p. 337
- Noriega, R.J., Schifini, C.G., (1989) J. Math. Phys., 30, p. 617
- Spivak, M., (1965) Calculus on Manifolds, , (Benjamin, New York)
- Rund, H., (1966) Abh. Math. Sem. Univ. Hamburg, 29, p. 243
- Noriega, R.J., (1984) Rev. Un. Mat. Argentina, 31, p. 149
- Horndeski, G.W., (1981) Utilitas Math., 19, p. 215
- Calvo, M.C., López, M.C., Noriega, R.J., Schifini, C.G., Gauge invariance of Euler-Lagrange expressions in Einstein-Yang-Mills field theories submitted to Gen. Relativ. Gravit; Lovelock, D., (1969) Arch. Rat. Mech. Anal., 33, p. 45
Citas:
---------- APA ----------
López, M.C., Noriega, R.J. & Schifini, C.G.
(1989)
. The equivariant inverse problem and the uniqueness of the Yang-Mills equations. Journal of Mathematical Physics, 30(10), 2382-2387.
http://dx.doi.org/10.1063/1.528568---------- CHICAGO ----------
López, M.C., Noriega, R.J., Schifini, C.G.
"The equivariant inverse problem and the uniqueness of the Yang-Mills equations"
. Journal of Mathematical Physics 30, no. 10
(1989) : 2382-2387.
http://dx.doi.org/10.1063/1.528568---------- MLA ----------
López, M.C., Noriega, R.J., Schifini, C.G.
"The equivariant inverse problem and the uniqueness of the Yang-Mills equations"
. Journal of Mathematical Physics, vol. 30, no. 10, 1989, pp. 2382-2387.
http://dx.doi.org/10.1063/1.528568---------- VANCOUVER ----------
López, M.C., Noriega, R.J., Schifini, C.G. The equivariant inverse problem and the uniqueness of the Yang-Mills equations. 1989;30(10):2382-2387.
http://dx.doi.org/10.1063/1.528568