N=4 super KdV equation

Abstract

We construct N=4 supersymmetric KdV equation as a hamiltonian flow on the N=4\;SU(2) super Virasoro algebra. The N=4 KdV superfield, the hamiltonian and the related Poisson structure are concisely formulated in 1D \;N=4 harmonic superspace. The most general hamiltonian is shown to necessarily involve SU(2) breaking parameters which are combined in a traceless rank 2 SU(2) tensor. First nontrivial conserved charges of N=4 super KdV (of dimensions 2 and 4) are found to exist if and only if the SU(2) breaking tensor is a bilinear of some SU(2) vector with a fixed length proportional to the inverse of the central charge of N=4\;SU(2) algebra. After the reduction to N=2 this restricted version of N=4 super KdV goes over to the a=4 integrable case of N=2 super KdV and so is expected to be integrable. We show that it is bi-hamiltonian like its N=2 prototype.

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