Abstract
AbstractWe relate the scattering theory of the focusing AKNS system with equally sized nonvanishing boundary conditions to that of the matrix Schrödinger equation. This (shifted) Miura transformation converts the focusing matrix nonlinear Schrödinger (NLS) equation into a new nonlocal integrable equation. We apply the matrix triplet method of solving the Marchenko integral equations by separation of variables to derive the multisoliton solutions of this nonlocal equation, thus proposing a method to solve the reflectionless matrix NLS equation.
Funder
Università degli Studi di Cagliari
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,General Engineering,Modeling and Simulation
Reference83 articles.
1. Ablowitz, M.J.: Nonlinear Dispersive Waves. Asymptotic Analysis and Solitons, Cambridge Texts in Applied Mathematics, vol. 47. Cambridge University Press, Cambridge (2011)
2. Ablowitz, M.J., Segur, H.: Solitons and Inverse Scattering Transforms. SIAM, Philadelphia (1981)
3. Ablowitz, M.J., Kaup, D.J., Newell, A.C., Segur, H.: The inverse scattering transform. Fourier analysis for nonlinear problems. Stud. Appl. Math. 53, 249–315 (1974)
4. Ablowitz, M.J., Prinari, B., Trubatch, A.D.: Discrete and Continuous Nonlinear Schrödinger Systems. Cambridge University Press, Cambridge (2004)
5. Aden, H., Carl, B.: On realizations of solutions of the KdV equation by determinants on operator ideals. J. Math. Phys. 37, 1833–1857 (1996)
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