journal article
Nov 01, 1987
Equivalence of four-dimensional self-duality equations and the continuum analog of the principal chiral field problem
Theoretical and Mathematical Physics
Vol. 73
No. 2
pp. 1233-1237
·
Springer Science and Business Media LLC
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References
8
[1]
A. N. Leznov, “Solitons of the two-dimensional chiral field and solutions of the four-dimensional Yang-Mills self-duality equations,” Preprint 86-81 [in Russian], Theoretical Physics Section, Institute of High Energy Physics, Serpukhov (1986).
[2]
M. K. Prasad, Physica (Utrecht),10, 167 (1980).
[3]
M. K. Prasad, A. Sinha, and L.-L. Wang, Phys. Lett. B,87, 237 (1979).
10.1016/0370-2693(79)90972-9
[4]
A. N. Leznov, V. I. Smirnov, and A. B. Shabat, Teor. Mat. Fiz.,51, 10 (1982).
10.1007/bf01029257
[5]
I. M. Krichever, Dokl. Akad. Nauk SSSR,253, 288 (1981).
[6]
A. N. Leznov, V. I. Man'ko, and S. N. Chumakov, “Soliton solutions for chiral dynamical systems,” Preprint No. 70 [in Russian], FIAN, Moscow (1984).
[7]
A. N. Leznov, V. I. Man'ko, and S. N. Chumakov, Tr. Fiz. Inst. Akad. Nauk SSSR, No. 167, 232 (1986).
[8]
A. N. Leznov, M. V. Savel'ev, and I. A. Fedoseev, “Bounded solutions of self-duality equations,” Preprint No. 77-146 [in Russian], Institute of High Energy Physics, Serpukhov (1977).
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References
Details
- Published
- Nov 01, 1987
- Vol/Issue
- 73(2)
- Pages
- 1233-1237
- License
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Cite This Article
A. N. Leznov (1987). Equivalence of four-dimensional self-duality equations and the continuum analog of the principal chiral field problem. Theoretical and Mathematical Physics, 73(2), 1233-1237. https://doi.org/10.1007/bf01017594
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