The Zero Curvature Formulation of TB, sTB Hierarchy and Topological Algebras

Abstract

A particular dispersive generalization of long water wave equation in 1+1 dimensions, which is important in the study of matrix models without scaling limit, known as two--Boson (TB) equation, as well as the associated hierarchy has been derived from the zero curvature condition on the gauge group SL(2,R) U(1). The supersymmetric extension of the two--Boson (sTB) hierarchy has similarly been derived from the zero curvature condition associated with the gauge supergroup OSp(2|2). Topological algebras arise naturally as the second Hamiltonian structure of these classical integrable systems, indicating a close relationship of these models with 2d topological field theories.

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