Extensions of the matrix Gelfand-Dickey hierarchy from generalized Drinfeld-Sokolov reduction
Abstract
The p× p matrix version of the r-KdV hierarchy has been recently treated as the reduced system arising in a Drinfeld-Sokolov type Hamiltonian symmetry reduction applied to a Poisson submanifold in the dual of the Lie algebra glpr [λ, λ-1]. Here a series of extensions of this matrix Gelfand-Dickey system is derived by means of a generalized Drinfeld-Sokolov reduction defined for the Lie algebra glpr+s [λ,λ-1] using the natural embedding glpr⊂ glpr+s for s any positive integer. The hierarchies obtained admit a description in terms of a p× p matrix pseudo-differential operator comprising an r-KdV type positive part and a non-trivial negative part. This system has been investigated previously in the p=1 case as a constrained KP system. In this paper the previous results are considerably extended and a systematic study is presented on the basis of the Drinfeld-Sokolov approach that has the advantage that it leads to local Poisson brackets and makes clear the conformal ( W-algebra) structures related to the KdV type hierarchies. Discrete reductions and modified versions of the extended r-KdV hierarchies are also discussed.
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