Inside the algebra LTN(R) of N×N-matrices with coefficients from a commutative algebra R over k=R or ℂ, that possess only a finite number of nonzero diagonals above the central diagonal, we consider two deformations of commutative Lie subalgebras generated by the nth power Sn,n⩾1, of the matrix S of the shift operator and a maximal commutative subalgebra h of gln(k), where the evolution equations of the deformed generators are determined by a set of Lax equations, each corresponding to a different decomposition of LTN(R). This yields the h[Sn]-hierarchy and its strict version. We show that both sets of Lax equations are equivalent to a set of zero curvature equations. Next we introduce two Cauchy problems linked with these sets of zero curv...
In this work we start from various basic sets of commuting directions in the Z × Z-matrices that are...
Partly inspired by Sato's theory of the Kadomtsev-Petviashvili (KP) hierarchy, we start with a quite...
We consider the generalized matrix non-linear Schrödinger (NLS) hierarchy. By employing the universa...
Inside the algebra LTN(R) of N×N-matrices with coefficients from a commutative algebra R over k=R or...
Let t be a commutative Lie subalgebra of sln(C) of maximal dimension. We consider in this paper thre...
Let h be a complex commutative subalgebra of the n×n matrices Mn(ℂ). In the algebra MPsd of matrix p...
In the algebra PsΔ of pseudodifference operators, we consider two deformations of the Lie subalgebra...
In this paper we consider various sets of commuting directions in the Z×Z-matrices. For each k≥1, we...
In this paper we discuss the algebraic structure of the tower of differential difference equations t...
In this paper we consider various sets of commuting directions in the Z×Z-matrices. For each k≥1, we...
We split the algebra of pseudodifferential operators in two different ways into the direct sum of tw...
The algebraic structures of zero curvature representations are furnished for multilayer integrable c...
In this paper we give a purely algebraic set-up for the equations of the matrix hierarchy that can b...
In this paper we present a natural embedding of the infinite Toda chain in a set of Lax equations in...
We discuss an integrable hierarchy of compatible Lax equations that is obtained by a wider deformati...
In this work we start from various basic sets of commuting directions in the Z × Z-matrices that are...
Partly inspired by Sato's theory of the Kadomtsev-Petviashvili (KP) hierarchy, we start with a quite...
We consider the generalized matrix non-linear Schrödinger (NLS) hierarchy. By employing the universa...
Inside the algebra LTN(R) of N×N-matrices with coefficients from a commutative algebra R over k=R or...
Let t be a commutative Lie subalgebra of sln(C) of maximal dimension. We consider in this paper thre...
Let h be a complex commutative subalgebra of the n×n matrices Mn(ℂ). In the algebra MPsd of matrix p...
In the algebra PsΔ of pseudodifference operators, we consider two deformations of the Lie subalgebra...
In this paper we consider various sets of commuting directions in the Z×Z-matrices. For each k≥1, we...
In this paper we discuss the algebraic structure of the tower of differential difference equations t...
In this paper we consider various sets of commuting directions in the Z×Z-matrices. For each k≥1, we...
We split the algebra of pseudodifferential operators in two different ways into the direct sum of tw...
The algebraic structures of zero curvature representations are furnished for multilayer integrable c...
In this paper we give a purely algebraic set-up for the equations of the matrix hierarchy that can b...
In this paper we present a natural embedding of the infinite Toda chain in a set of Lax equations in...
We discuss an integrable hierarchy of compatible Lax equations that is obtained by a wider deformati...
In this work we start from various basic sets of commuting directions in the Z × Z-matrices that are...
Partly inspired by Sato's theory of the Kadomtsev-Petviashvili (KP) hierarchy, we start with a quite...
We consider the generalized matrix non-linear Schrödinger (NLS) hierarchy. By employing the universa...