We split the algebra of pseudodifferential operators in two different ways into the direct sum of two Lie subalgebras and deform the set of commuting elements in one subalgebra in the direction of the other component. The evolution of these deformed elements leads to two compatible systems of Lax equations that both have a minimal realization. We show that this Lax form is equivalent to a set of zero-curvature relations. We conclude by presenting linearizations of these systems, which form the key framework for constructing the solutions
Let t be a commutative Lie subalgebra of sln(C) of maximal dimension. We consider in this paper thre...
We compute differential invariants for several Lie pseudogroups, and use them for solving the equiva...
International audienceIn this paper, we consider the action of Vect($S^1$) by Lie derivative on the ...
In the algebra PsΔ of pseudodifference operators, we consider two deformations of the Lie subalgebra...
Inside the algebra LTN(R) of N×N-matrices with coefficients from a commutative algebra R over k=R or...
Inside the algebra LTN(R) of N×N-matrices with coefficients from a commutative algebra R over k=R or...
The theory of q-deformed pseudo-differential operators can be de-fined by means of the q-derivative ...
We discuss an integrable hierarchy of compatible Lax equations that is obtained by a wider deformati...
The correspondence between ordinary differential equations and Bethe ansatz equations for integrable...
In this paper we discuss the algebraic structure of the tower of differential difference equations t...
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...
Abstract. In [17, 19], Melrose has studied examples of non-compact mani-folds M0 whose large scale g...
In this paper we present a natural embedding of the infinite Toda chain in a set of Lax equations in...
We discuss the algebraic and analytic structure of rational Lax operators. With algebraic reductions...
Let t be a commutative Lie subalgebra of sln(C) of maximal dimension. We consider in this paper thre...
We compute differential invariants for several Lie pseudogroups, and use them for solving the equiva...
International audienceIn this paper, we consider the action of Vect($S^1$) by Lie derivative on the ...
In the algebra PsΔ of pseudodifference operators, we consider two deformations of the Lie subalgebra...
Inside the algebra LTN(R) of N×N-matrices with coefficients from a commutative algebra R over k=R or...
Inside the algebra LTN(R) of N×N-matrices with coefficients from a commutative algebra R over k=R or...
The theory of q-deformed pseudo-differential operators can be de-fined by means of the q-derivative ...
We discuss an integrable hierarchy of compatible Lax equations that is obtained by a wider deformati...
The correspondence between ordinary differential equations and Bethe ansatz equations for integrable...
In this paper we discuss the algebraic structure of the tower of differential difference equations t...
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...
Abstract. In [17, 19], Melrose has studied examples of non-compact mani-folds M0 whose large scale g...
In this paper we present a natural embedding of the infinite Toda chain in a set of Lax equations in...
We discuss the algebraic and analytic structure of rational Lax operators. With algebraic reductions...
Let t be a commutative Lie subalgebra of sln(C) of maximal dimension. We consider in this paper thre...
We compute differential invariants for several Lie pseudogroups, and use them for solving the equiva...
International audienceIn this paper, we consider the action of Vect($S^1$) by Lie derivative on the ...