A generalized MKdV hierarchy, tri-Hamiltonian structure, higher-order binary constrained flows and its integrable couplings system

Abstract A subalgebra of higher-dimension loop algebra A 2 ˜ is constructed, from which a new 3 × 3 isospectral problem is designed. By making use of Tu’s scheme, an integrable Hamiltonian hierarchy of equations in the sense of Liouville is obtained, which possesses tri-Hamiltonian structure. As reduction cases of the hierarchy presented in this paper, the generalized MKdV equation is engendered. By establishing binary symmetric constraints, three constrained flows of the hierarchy are presented, which are then reduced to Hamiltonian systems. Finally, an integrable coupling system is obtained by constructing a high-dimension loop algebra.

[1]  Xing-Biao Hu,et al.  A powerful approach to generate new integrable systems , 1994 .

[2]  P. Olver Applications of Lie Groups to Differential Equations , 1986 .

[3]  Y. Nutku On a new class of completely integrable nonlinear wave equations. II. Multi‐Hamiltonian structure , 1987 .

[4]  Yufeng Zhang,et al.  A direct method for integrable couplings of TD hierarchy , 2002 .

[5]  Yunbo Zeng An approach to the deduction of the finite-dimensional integrability from the infinite-dimensional integrability , 1991 .

[6]  Yunbo Zeng,et al.  New factorization of the Kaup-Newell hierarchy , 1994 .

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

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

[9]  A generalized AKNS hierarchy and its bi-Hamiltonian structures , 2005 .

[10]  Engui Fan,et al.  Integrable evolution systems based on Gerdjikov-Ivanov equations, bi-Hamiltonian structure, finite-dimensional integrable systems and N-fold Darboux transformation , 2000 .

[11]  M. Wadati,et al.  The Modified Korteweg-de Vries Equation , 1973 .

[12]  Wen-Xiu Ma,et al.  K symmetries and tau symmetries of evolution equations and their Lie algebras , 1990 .

[13]  Finite Dimensional Hamiltonians and Almost-Periodic Solutions for 2+1 Dimensional Three-Wave Equations , 2002 .

[14]  Gui‐zhang Tu,et al.  The trace identity, a powerful tool for constructing the Hamiltonian structure of integrable systems , 1989 .

[15]  M. Lakshmanan,et al.  Lie–Bäcklund symmetries of certain nonlinear evolution equations under perturbation around their solutions , 1985 .

[16]  C. Gu,et al.  Soliton theory and its applications , 1995 .

[17]  Hong-qing Zhang,et al.  Integrable couplings of Botie–Pempinelli–Tu (BPT) hierarchy , 2002 .