We consider cohomological and Poisson structures associated with the special tautological subbundles TBW1,2,...,n for the Birkhoff strata of the Sato Grassmannian. We show that the tangent bundles of TBW1,2,...,n are isomorphic to the linear spaces of two-coboundaries with vanishing Harrison cohomology modules. A special class of two-coboundaries is provided by a system of integrable quasilinear partial differential equations. For the big cell, it is the hierarchy of dispersionless Kadomtsev-Petvishvili (dKP) equations. We also demonstrate that the families of ideals for algebraic varieties in TBW1,2,...,n can be viewed as Poisson ideals. This observation establishes a relation between families of algebraic curves in TBWŜ and coisotropic deformations of such curves of zero and nonzero genus described by hierarchies of systems of hydrodynamic type; the dKP hierarchy is such a hierarchy. We note the interrelation between cohomological and Poisson structures. © 2013 Pleiades Publishing, Ltd.
Cohomological and Poisson structures and integrable hierarchies in tautological subbundles for Birkhoff strata of the Sato Grassmannian
ORTENZI, GIOVANNI
2013-01-01
Abstract
We consider cohomological and Poisson structures associated with the special tautological subbundles TBW1,2,...,n for the Birkhoff strata of the Sato Grassmannian. We show that the tangent bundles of TBW1,2,...,n are isomorphic to the linear spaces of two-coboundaries with vanishing Harrison cohomology modules. A special class of two-coboundaries is provided by a system of integrable quasilinear partial differential equations. For the big cell, it is the hierarchy of dispersionless Kadomtsev-Petvishvili (dKP) equations. We also demonstrate that the families of ideals for algebraic varieties in TBW1,2,...,n can be viewed as Poisson ideals. This observation establishes a relation between families of algebraic curves in TBWŜ and coisotropic deformations of such curves of zero and nonzero genus described by hierarchies of systems of hydrodynamic type; the dKP hierarchy is such a hierarchy. We note the interrelation between cohomological and Poisson structures. © 2013 Pleiades Publishing, Ltd.File | Dimensione | Formato | |
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