NON-LOCAL EXTENSIONS OF THE CONFORMAL ALGEBRA : MATRIX W-ALGEBRAS, MATRIX KdV-HIERARCHIES AND NON-ABELIAN TODA THEORIES,

Abstract

In the present contribution, I report on certain non-linear and non-local extensions of the conformal (Virasoro) algebra. These so-called V-algebras are matrix generalizations of W-algebras. First, in the context of two-dimensional field theory, I discuss the non-abelian Toda model which possesses three conserved (chiral) ``currents". The Poisson brackets of these ``currents" give the simplest example of a V-algebra. The classical solutions of this model provide a free-field realization of the V-algebra. Then I show that this V-algebra is identical to the second Gelfand-Dikii symplectic structure on the manifold of 2× 2-matrix Schr\"odinger operators L=-2+U (with σ3 U=0). This provides a relation with matrix KdV-hierarchies and allows me to obtain an infinite family of conserved charges (Hamiltonians in involution). Finally, I work out the general Vn,m-algebras as symplectic structures based on n× n-matrix m th-order differential operators L=-m +U2m-2+U3 m-3+… +Um. It is the absence of U1, together with the non-commutativity of matrices that leads to the non-local terms in the Vn,m-algebras. I show that the conformal properties are similar to those of Wm-algebras, while the complete Vn,m-algebras are much more complicated, as is shown on the explicit example of Vn,3.

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