The Generalized Moyal Nahm and Continuous Moyal Toda Equations

Abstract

We present in detail a class of solutions to the 4D SU(∞) Moyal Anti Self Dual Yang Mills equations that are related to reductions of the generalized Moyal Nahm quations using the Ivanova-Popov ansatz. The former yields solutions to the ASDYM/SDYM equations for arbitary gauge groups. A further dimensional reduction yields solutions to the Moyal Anti Self Dual Gravitational equations. The Self Dual Yang Mills /Self Dual Gravity case requires a separate study. SU(2) and SU(∞) (continuous) Moyal Toda equations are derived and solutions to the latter equations in implicit form are proposed via the Lax-Brockett double commutator formalism . An explicit map taking the Moyal heavenly form (after a rotational Killing symmetry reduction) into the SU(2) Moyal Toda field is found. Finally, the generalized Moyal Nahm equations are conjectured that contain the continuous SU(∞) Moyal Toda equation after a suitable reduction. Three different embeddings of the three different types of Moyal Toda equations into the Moyal Nahm equations are discussed.

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