Subject
Mathematical Physics,Statistical and Nonlinear Physics
Reference6 articles.
1. M. Marvan, “On zero-curvature representations of partial differential equations,” in: Proceedings of the 5th International Conference on Differential Geometry and Its Applications (Opava, Czechoslovakia, August 24–28, 1992, O. Kowalski and D. Krupka, eds.), Silesian Univ., Opava, Czech Republic (1993), pp. 103–122, http://www.emis.de/proceedings/5ICDGA.
2. K. Pohlmeyer, “Integrable Hamiltonian systems and interactions through quadratic constraints,” Commun. Math. Phys., 46, 207–221 (1976).
3. F. Lund and T. Regge, “Unified approach to strings and vortices with soliton solutions,” Phys. Rev. D, 14, 1524–1535 (1976).
4. A. V. Balandin, “Characteristics of conservation laws of chiral-type systems,” Lett. Math. Phys., 105, 27–43 (2015); arXiv: 1310.5218.
5. A. V. Balandin, “Tensor fields associated with integrable systems of chiral type,” Zhurnal SVMO, 21, 405–412 (2019).