Normal forms of elliptic automorphic Lie algebras and Landau-Lifshitz type of equations
Abstract
We present normal forms of elliptic automorphic Lie algebras with dihedral symmetry of order 4, which arise naturally in the context of Landau-Lifshitz type of equations. These normal forms provide a transparent description and allow a classification of such Lie algebras over C. Using this perspective, we show that a Lie algebra introduced by Uglov, as well as the hidden symmetry algebra of the Landau-Lifshitz equation by Holod, are both isomorphic to an elliptic sl(2,C)-current algebra. Furthermore, we realise the Wahlquist-Estabrook algebra of the Landau-Lifshitz equation in terms of elliptic automorphic Lie algebras. This construction reveals that, as complex Lie algebras, it is isomorphic to the direct sum of an sl(2,C)-current algebra and the two-dimensional abelian Lie algebra C2. Finally, we explicitly implement the automorphic Lie algebra framework in the context of an n-component generalisation of the Landau-Lifshitz equation by Golubchik and Sokolov in the case of n=3.
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