Multi-Component KdV Hierarchy, V-Algebra and Non-Abelian Toda Theory
Abstract
I prove the recently conjectured relation between the 2× 2-matrix differential operator L=∂2-U, and a certain non-linear and non-local Poisson bracket algebra (V-algebra), containing a Virasoro subalgebra, which appeared in the study of a non-abelian Toda field theory. Here, I show that this V-algebra is precisely given by the second Gelfand-Dikii bracket associated with L. The Miura transformation is given which relates the second to the first Gelfand-Dikii bracket. The two Gelfand-Dikii brackets are also obtained from the associated (integro-) differential equation satisfied by fermion bilinears. The asymptotic expansion of the resolvent of (L-)=0 is studied and its coefficients Rl yield an infinite sequence of hamiltonians with mutually vanishing Poisson brackets. I recall how this leads to a matrix KdV hierarchy which are flow equations for the three component fields T, V+, V- of U. For V=0 they reduce to the ordinary KdV hierarchy. The corresponding matrix mKdV equations are also given, as well as the relation to the pseudo- differential operator approach. Most of the results continue to hold if U is a hermitian n× n-matrix. Conjectures are made about n× n-matrix m th-order differential operators L and associated V(n,m)-algebras.
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