An integrable generalization of the D-Kaup-Newell soliton hierarchy and its bi-Hamiltonian reduced hierarchy

We present a new spectral problem, a generalization of the D-Kaup–Newell spectral problem, associated with the Lie algebra sl(2,R). Zero curvature equations furnish the soliton hierarchy. The trace identity produces the Hamiltonian structure for the hierarchy and shows its Liouville integrability. Lastly, a reduction of the spectral problem is shown to have a different soliton hierarchy with a bi-Hamiltonian structure. The major motivation of this paper is to present spectral problems that generate two soliton hierarchies with infinitely many conservation laws and high-order symmetries.

[1]  Halis Yilmaz,et al.  Exact solutions of the Gerdjikov-Ivanov equation using Darboux transformations , 2015, Journal of Nonlinear Mathematical Physics.

[2]  P. Casati,et al.  The soliton equations associated with the affine Kac–Moody Lie algebra G2(1) , 2006, nlin/0610034.

[3]  J. Gibbon A survey of the origins and physical importance of soliton equations , 1985, Philosophical Transactions of the Royal Society of London. Series A, Mathematical and Physical Sciences.

[4]  Willy Hereman,et al.  Direct Methods and Symbolic Software for Conservation Laws of Nonlinear Equations. , 2008, 0803.0083.

[5]  Wen-Xiu Ma A spectral problem based on so(3,R) and its associated commuting soliton equations , 2013 .

[6]  Benno Fuchssteiner,et al.  Application of hereditary symmetries to nonlinear evolution equations , 1979 .

[7]  Wen-Xiu Ma,et al.  Integrable counterparts of the D-Kaup-Newell soliton hierarchy , 2014, Appl. Math. Comput..

[8]  Wenxiu Ma,et al.  A generalized Kaup-Newell spectral problem, soliton equations and finite-dimensional integrable systems , 1995 .

[9]  P. Lax Integrals of Nonlinear Equations of Evolution and Solitary Waves , 1968 .

[10]  Wen-Xiu Ma A soliton hierarchy associated with so(3, R)so(3, R) , 2013, Appl. Math. Comput..

[11]  M. Pedroni,et al.  Bihamiltonian Geometry, Darboux Coverings,¶and Linearization of the KP Hierarchy , 1998, solv-int/9806002.

[12]  Franco Magri,et al.  A Simple model of the integrable Hamiltonian equation , 1978 .

[13]  David J. Kaup,et al.  An exact solution for a derivative nonlinear Schrödinger equation , 1978 .

[14]  C. S. Gardner,et al.  Korteweg‐de Vries Equation and Generalizations. II. Existence of Conservation Laws and Constants of Motion , 1968 .

[15]  Reduced D-Kaup–Newell soliton hierarchies from sl(2,R) and so(3,R) , 2016 .

[16]  Wen-Xiu Ma,et al.  Reduced D-Kaup–Newell soliton hierarchies from sl(2,ℝ) and so(3,ℝ) , 2016 .

[17]  Wenxiu Ma,et al.  Lax representations and Lax operator algebras of isospectral and nonisospectral hierarchies of evolution equations , 1992 .

[18]  Peter J. Olver,et al.  Symmetry Groups of Differential Equations , 1986 .

[19]  M. Ablowitz,et al.  The Inverse scattering transform fourier analysis for nonlinear problems , 1974 .

[20]  Athanassios S. Fokas,et al.  Symplectic structures, their B?acklund transformation and hereditary symmetries , 1981 .

[21]  An integrable generalization of the Kaup-Newell soliton hierarchy , 2014 .

[22]  Tu Gui-Zhang,et al.  On Liouville integrability of zero-curvature equations and the Yang hierarchy , 1989 .

[23]  P. Olver Applications of lie groups to differential equations , 1986 .

[24]  Robert M. Miura,et al.  Korteweg-de Vries Equation and Generalizations. I. A Remarkable Explicit Nonlinear Transformation , 1968 .

[25]  Wen-Xiu Ma,et al.  A coupled AKNS–Kaup–Newell soliton hierarchy , 1999 .

[26]  M. Wadati,et al.  Relationships among Inverse Method, Bäcklund Transformation and an Infinite Number of Conservation Laws , 1975 .

[27]  M. Ablowitz,et al.  Solitons, Nonlinear Evolution Equations and Inverse Scattering , 1992 .

[28]  W. Ma,et al.  Virasoro symmetry algebra of Dirac soliton hierarchy , 1996, solv-int/9609006.

[29]  W. Ma The algebraic structures of isospectral Lax operators and applications to integrable equations , 1992 .

[30]  A soliton hierarchy associated with a new spectral problem and its Hamiltonian structure , 2015 .

[31]  Wenxiu Ma Lie Algebra Structures Associated with Zero Curvature Equations and Generalized Zero Curvature Equations , 2013 .