THE MINIMAL N=2 SUPEREXTENSION OF THE NLS EQUATION
Abstract
We show that the well known N=1 NLS equation possesses N=2 supersymmetry and thus it is actually the N=2 NLS equation. This supersymmetry is hidden in terms of the commonly used N=1 superfields but it becomes manifest after passing to the N=2 ones. In terms of the new defined variables the second Hamiltonian structure of the supersymmetric NLS equation coincides with the N=2 superconformal algebra and the N=2 NLS equation belongs to the N=2 a=4 KdV hierarchy. We propose the KP-like Lax operator in terms of the N=2 superfields which reproduces all the conserved currents for the corresponding hierarchy.
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