Inverse Scattering and Soliton Solutions of Nonlocal Complex Reverse-Spacetime Modified Korteweg-de Vries Hierarchies
Liming Ling, Wen‐Xiu Ma
Abstract
This paper aims to explore nonlocal complex reverse-spacetime modified Korteweg-de Vries (mKdV) hierarchies via nonlocal symmetry reductions of matrix spectral problems and to construct their soliton solutions by the inverse scattering transforms. The corresponding inverse scattering problems are formulated by building the associated Riemann-Hilbert problems. A formulation of solutions to specific Riemann-Hilbert problems, with the jump matrix being the identity matrix, is established, where eigenvalues could equal adjoint eigenvalues, and thus N-soliton solutions to the nonlocal complex reverse-spacetime mKdV hierarchies are obtained from the reflectionless transforms.
Topics & Concepts
Inverse scattering problemEigenvalues and eigenvectorsSolitonSpacetimeInverse scattering transformMathematical physicsInverseRiemann hypothesisMatrix (chemical analysis)MathematicsSymmetry (geometry)Quantum inverse scattering methodKorteweg–de Vries equationScatteringHilbert spaceLax pairMathematical analysisPhysicsInverse problemIntegrable systemQuantum mechanicsNonlinear systemGeometryMaterials scienceComposite materialNonlinear Waves and SolitonsNonlinear Photonic SystemsQuantum Mechanics and Non-Hermitian Physics