Some Aspects of Moyal Deformed Integrable Systems

Abstract

Besides its various applications in string and D-brane physics, the θ-deformation of space (-time) coordinates (naively called the noncommutativity of coordinates), based on the -product, behaves as a more general framework providing more mathematical and physical informations about the associated system. Similarly to the Gelfand-Dickey framework of pseudo differential operators, the Moyal θ-deformation applied to physical problems makes the study more systematic. Using these facts as well as the backgrounds of Moyal momentum algebra introduced in previous works [21, 25, 26], we look for the important task of studying integrability in the θ-deformation framework. The main focus is on the θ-deformation version of the Lax representation of two principal examples: the sl2 KdVθ equation and the Moyal θ-version of the Burgers systems. Important properties are presented.

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