We describe two modules for the algebra Psd of pseudodifferential operators; for each of them, we define an associated system from which the Lax equations of the strict KP hierarchy can be obtained as compatibility conditions. We construct a set of bilinear equations on these modules that characterizes solutions of the strict KP hierarchy that are obtained by dressing the basic generator of Psd
In the present paper we introduce a new hierarchy, each equation of which is defined by several bra...
In this paper we give a purely algebraic set-up for the equations of the matrix hierarchy that can b...
We split the algebra of pseudodifferential operators in two different ways into the direct sum of tw...
Splitting the algebra Psd of pseudodifferential operators into the Lie subalgebra of all differentia...
In the algebra PsΔ of pseudodifference operators, we consider two deformations of the Lie subalgebra...
In a previous paper we associated to each invertible constant pseudo difference operator Λ0 of degre...
We review the construction of the KdV-type hierarchies of equations using the pseu-dodifferential op...
We define a Lax operator as a monic pseudodifferential operator L(∂) of order N ≥ 1, such that the L...
Let h be a complex commutative subalgebra of the n×n matrices Mn(ℂ). In the algebra MPsd of matrix p...
We show that a system of Hirota bilinear equations introduced by Jimbo and Miwa defines tau-function...
We discuss an integrable hierarchy of compatible Lax equations that is obtained by a wider deformati...
Abstract: We show that both the dKP hierarchy and its strict version can be extended to a wider clas...
The Grassmann manifold approach to the KP hierarchy, in the spirit of Segal and Wilson, is used to d...
By restricting a linear system for the KP hierarchy to those independent variables tn with odd n, it...
A new Lax equation is introduced for the KP hierarchy which avoids the use of pseudo-differential op...
In the present paper we introduce a new hierarchy, each equation of which is defined by several bra...
In this paper we give a purely algebraic set-up for the equations of the matrix hierarchy that can b...
We split the algebra of pseudodifferential operators in two different ways into the direct sum of tw...
Splitting the algebra Psd of pseudodifferential operators into the Lie subalgebra of all differentia...
In the algebra PsΔ of pseudodifference operators, we consider two deformations of the Lie subalgebra...
In a previous paper we associated to each invertible constant pseudo difference operator Λ0 of degre...
We review the construction of the KdV-type hierarchies of equations using the pseu-dodifferential op...
We define a Lax operator as a monic pseudodifferential operator L(∂) of order N ≥ 1, such that the L...
Let h be a complex commutative subalgebra of the n×n matrices Mn(ℂ). In the algebra MPsd of matrix p...
We show that a system of Hirota bilinear equations introduced by Jimbo and Miwa defines tau-function...
We discuss an integrable hierarchy of compatible Lax equations that is obtained by a wider deformati...
Abstract: We show that both the dKP hierarchy and its strict version can be extended to a wider clas...
The Grassmann manifold approach to the KP hierarchy, in the spirit of Segal and Wilson, is used to d...
By restricting a linear system for the KP hierarchy to those independent variables tn with odd n, it...
A new Lax equation is introduced for the KP hierarchy which avoids the use of pseudo-differential op...
In the present paper we introduce a new hierarchy, each equation of which is defined by several bra...
In this paper we give a purely algebraic set-up for the equations of the matrix hierarchy that can b...
We split the algebra of pseudodifferential operators in two different ways into the direct sum of tw...