Boussinesq-type equations from nonlinear realizations of W3

Abstract

We construct new coset realizations of infinite-dimensional linear W3∞ symmetry associated with Zamolodchikov's W3 algebra which are different from the previously explored sl3 Toda realization of W3∞. We deduce the Boussinesq and modified Boussinesq equations as constraints on the geometry of the corresponding coset manifolds.The main characteristic features of these realizations are:i. Among the coset parameters there are the space and time coordinates x and t which enter the Boussinesq equations, all other coset parameters are regarded as fields depending on these coordinates;ii. The spin 2 and 3 currents of W3 and two spin 1 U(1) Kac- Moody currents as well as two spin 0 fields related to the W3currents via Miura maps, come out as the only essential parameters-fields of these cosets. The remaining coset fields are covariantly expressed through them;iii.The Miura maps get a new geometric interpretation as W3∞ covariant constraints which relate the above fields while passing from one coset manifold to another; iv. The Boussinesq equation and two kinds of the modified Boussinesq equations appear geometrically as the dynamical constraints accomplishing W3∞ covariant reductions of original coset manifolds to their two-dimensional geodesic submanifolds;v. The zero-curvature representations for these equations arise automatically as a consequence of the covariant reduction. The approach proposed could provide a universal geometric description of the relationship between W-type algebras and integrable hierarchies.

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