Nilpotent action on the KdV variables and 2-dimensional Drinfeld-Sokolov reduction
Abstract
We note that a version ``with spectral parameter'' of the Drinfeld-Sokolov reduction gives a natural mapping from the KdV phase space to the group of loops with values in N+/A, N+~: affine nilpotent and A principal commutative (or anisotropic Cartan) subgroup~; this mapping is connected to the conserved densities of the hierarchy. We compute the Feigin-Frenkel action of n+ (defined in terms of screening operators) on the conserved densities, in the sl2 case.
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