Semi-direct sums of Lie algebras and continuous integrable couplings

A relation between semi-direct sums of Lie algebras and integrable couplings of continuous soliton equations is presented, and correspondingly, a feasible way to construct integrable couplings is furnished. A direct application to the AKNS spectral problem leads to a novel hierarchy of integrable couplings of the AKNS hierarchy of soliton equations. It is also indicated that the study of integrable couplings using semi-direct sums of Lie algebras is an important step towards complete classification of integrable systems.

[1]  Mark J. Ablowitz,et al.  Nonlinear differential−difference equations , 1975 .

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

[3]  Dengyuan Chen,et al.  The conservation laws of some discrete soliton systems , 2002 .

[4]  S. Manakov Complete integrability and stochastization of discrete dynamical systems , 1974 .

[5]  Xi-Xiang Xu,et al.  Positive and Negative Hierarchies of Integrable Lattice Models Associated with a Hamiltonian Pair , 2004 .

[6]  Wen-Xiu Ma,et al.  Binary nonlinearization of spectral problems of the perturbation AKNS systems , 2002 .

[7]  M. Wadati,et al.  Integrable semi-discretization of the coupled modified KdV equations , 1998 .

[8]  Yufeng Zhang A generalized multi-component Glachette–Johnson (GJ) hierarchy and its integrable coupling system , 2004 .

[9]  Wenxiu Ma,et al.  Rational solutions of the Toda lattice equation in Casoratian form , 2004 .

[10]  Wen-Xiu Ma,et al.  Enlarging spectral problems to construct integrable couplings of soliton equations , 2003 .

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

[12]  H. Flaschka The Toda lattice. II. Existence of integrals , 1974 .

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

[14]  Wen-Xiu Ma,et al.  Complexiton solutions of the Toda lattice equation , 2004 .

[15]  P. Sorba,et al.  Dictionary on lie algebras and superalgebras , 2000 .

[16]  Xi-Xiang Xu,et al.  A modified Toda spectral problem and its hierarchy of bi-Hamiltonian lattice equations , 2004 .

[17]  Wenxiu Ma,et al.  Algebraic Structure of Discrete Zero Curvature Equations and Master Symmetries of Discrete Evolution Equations , 1998, solv-int/9809009.

[18]  Hideaki Ujino,et al.  Integrable semi-discretization of the coupled nonlinear Schr\ , 1999, solv-int/9903013.

[19]  W. Ma Integrable couplings of soliton equations by perturbations I: A general theory and application to the KDV hierarchy , 1999, solv-int/9912004.

[20]  On Integrability of a (2+1)-Dimensional Perturbed KdV Equation , 1998, solv-int/9805012.

[21]  Yufeng Zhang,et al.  A new loop algebra and a corresponding integrable hierarchy, as well as its integrable coupling , 2003 .

[22]  B. Fuchssteiner,et al.  Integrable theory of the perturbation equations , 1996, solv-int/9604004.

[23]  A generalized Wadati–Konno–Ichikawa hierarchy and its binary nonlinearization by symmetry constraints , 2003 .

[24]  Yufeng Zhang,et al.  A new algebraic system and its applications , 2005 .

[25]  New hierarchies of integrable positive and negative lattice models and Darboux transformation , 2005 .

[26]  A. Jamiołkowski Applications of Lie groups to differential equations , 1989 .

[27]  K. Brown,et al.  Graduate Texts in Mathematics , 1982 .

[28]  Wen-Xiu Ma,et al.  An explicit symmetry constraint for the Lax pairs and the adjoint Lax pairs of AKNS systems , 1994 .

[29]  Ruguang Zhou,et al.  Nonlinearization of spectral problems for the perturbation KdV systems , 2001 .

[30]  W. Ma A bi-Hamiltonian formulation for triangular systems by perturbations , 2001, nlin/0112009.

[31]  Wen-Xiu Ma The algebraic structure of zero curvature representations and application to coupled KdV systems , 1993 .

[32]  Yufeng Zhang,et al.  A simple method for generating integrable hierarchies with multi-potential functions , 2005 .

[33]  Wen-Xiu Ma,et al.  THE BI-HAMILTONIAN STRUCTURE OF THE PERTURBATION EQUATIONS OF THE KDV HIERARCHY , 1996 .

[34]  Sergei Yu. Sakovich Coupled KdV Equations of Hirota-Satsuma Type , 1999 .

[35]  A. Perelomov,et al.  Classical integrable finite-dimensional systems related to Lie algebras , 1981 .

[36]  Wen-Xiu Ma Integrable couplings of vector AKNS soliton equations , 2005 .

[37]  Miss A.O. Penney (b) , 1974, The New Yale Book of Quotations.

[38]  O. Bogoyavlensky On perturbations of the periodic Toda lattice , 1976 .

[39]  T Gui-zhang,et al.  A trace identity and its applications to the theory of discrete integrable systems , 1990 .