论文信息 - A subalgebra of Lie algebra A2 and its associated two types of loop algebras, as well as Hamiltonian structures of integrable hierarchy

A subalgebra of Lie algebra A2 and its associated two types of loop algebras, as well as Hamiltonian structures of integrable hierarchy

In this paper, a subalgebra A2 of the Lie algebra A2 is constructed, which gives a corresponding loop algebra A¯2 by properly choosing the gradation of the basis elements. It follows that an isospectral problem is established and a new Liouville integrable Hamiltonian hierarchy is obtained. By making use of a matrix transformation, a subalgebra A2 of the Lie algebra A1 is presented, which possesses the same communicative operations of basis elements as those in A2. Again we expand the Lie algebra A1 into a high-dimensional loop algebra G, and a type of expanding integrable system of the hierarchy obtained above is worked out. Furthermore, Hamiltonian structures of hierarchy are presented by use of the quadratic form identity.

Dong Huan-he

[1] W. Ma. Multi-component bi-Hamiltonian Dirac integrable equations , 2009 .

[2] Xing-Biao Hu,et al. An approach to generate superextensions of integrable systems , 1997 .

[3] Wenxiu Ma,et al. Hamiltonian and quasi-Hamiltonian structures associated with semi-direct sums of Lie algebras , 2006 .

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

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

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

[7] Yu Fa-jun,et al. Multi-component C-KdV Hierarchy of Soliton Equations and Its Multi-component Integrable Coupling System* , 2004 .

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

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

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

[11] Wen-Xiu Ma,et al. Semi-direct sums of Lie algebras and continuous integrable couplings , 2006, nlin/0603064.

[12] 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 .

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