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AN ALGEBRAIC STRUCTURE OF ZERO CURVATURE REPRESENTATIONS ASSOCIATED WITH COUPLED INTEGRABLE COUPLINGS AND APPLICATIONS TO tau-SYMMETRY ALGEBRAS
Journal article   Peer reviewed

AN ALGEBRAIC STRUCTURE OF ZERO CURVATURE REPRESENTATIONS ASSOCIATED WITH COUPLED INTEGRABLE COUPLINGS AND APPLICATIONS TO tau-SYMMETRY ALGEBRAS

Lin Luo, Wen-Xiu Ma and Engui Fan
International journal of modern physics. B, Condensed matter physics, statistical physics, applied physics, Vol.25(23-24), pp.3237-3252
30/09/2011
DOI: https://doi.org/10.1142/S0217979211101351

Abstract

Physical Sciences Physics Physics, Applied Physics, Condensed Matter Physics, Mathematical Science & Technology
We establish an algebraic structure for zero curvature representations of coupled integrable couplings. The adopted zero curvature representations are associated with Lie algebras possessing two sub-Lie algebras in form of semi-direct sums of Lie algebras. By applying the presented algebraic structures to the AKNS systems, we give an approach for generating tau-symmetry algebras of coupled integrable couplings.

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