Recursion Operators and Reductions of Integrable Equations on Symmetric Spaces

@inproceedings{Gerdjikov2011RecursionOA,
  title={Recursion Operators and Reductions of Integrable Equations on Symmetric Spaces},
  author={V. S. Gerdjikov and Alexander V. Mikhailov and Tihomir I. Valchev},
  year={2011}
}
We study certain classes of integrable nonlinear differential equations related to the type symmetric spaces. Our main examples concern equations related to A.III-type symmetric spaces. We use the Cartan involution corresponding to this symmetric space as an element of the reduction group and restrict generic Lax operators to this symmetric space. Next we outline the spectral theory of the reduced Lax operator L and construct its fundamental analytic solutions. Analyzing the Wronskian relations… 
View via Publisher
projecteuclid.org
18 Citations
Highly Influential Citations
2
Background Citations
7
Methods Citations
1
Results Citations
2

18 Citations

Citation Type

Citation Type

On Certain Reductions of Integrable Equations on Symmetric Spaces
We derive a Z2×Z2 reduced integrable system which is deeply connected with the famous Heisenberg ferromagnet equation. Its Lax pair is associated with the symmetric space SO(5)/SO(2)×SO(3). We study
Polynomial Bundles and Generalised Fourier Transforms for Integrable Equations on A.III-type Symmetric Spaces
A special class of integrable nonlinear differential equations related to A.III-type symmetric spaces and having additional reductions are analyzed via the inverse scattering method (ISM). Using the
Rational bundles and recursion operators for integrable equations on A.III-type symmetric spaces
We analyze and compare methods for constructing the recursion operators for a special class of integrable nonlinear differential equations related to symmetric spaces of the type A.III in Cartan’s
Gauge equivalent integrable equations on sl(3) with reductions
We consider an auxiliary linear problem on the algebra sl(3) with reductions of 2 × 2 type introduced recently by Gerdjikov, Mikhailov and Valchev (GMV), and discuss its relation with a Generalized
Geometric Theory of the Recursion Operators for the Generalized Zakharov-Shabat System in Pole Gauge on the Algebra sl(n,C)
We consider the recursion operator approach to the soliton equations related to the generalized Zakharov-Shabat system on the algebra sl(n,C) in pole gauge both in the general position and in the
CBC Systems with Mikhailov Reductions by Coxeter Automorphism: I. Spectral Theory of the Recursion Operators
We consider the Caudrey–Beals–Coifman linear problem (CBC problem) and the theory of the Recursion Operators (Generating Operators) related to it in the presence of Zh ‐reductions of Mikhailov type
A twisted integrable hierarchy with D2 symmetry
A loop algebra approach to the Gerdjikov-Mikhailov-Valchev (GMV) equation is provided to exploit the associated twisted integrable structure and a new twisted integrable hierarchy is discovered.
On nonlocal reductions of a generalized Heisenberg ferromagnet equation
We study nonlocal reductions of coupled equations in $1+1$ dimensions of the Heisenberg ferromagnet type. The equations under consideration are completely integrable and have a Lax pair related to a
Pseudo-Hermitian Reduction of a Generalized Heisenberg Ferromagnet Equation. II. Special Solutions
This paper is a continuation of our previous work in which we studied a sl (3, ℂ) Zakharov-Shabat type auxiliary linear problem with reductions of Mikhailov type and the corresponding integrable
On the recursion operators for the Gerdjikov, Mikhailov, and Valchev system
We consider the Recursion Operator approach to the soliton equations related to an auxiliary linear system introduced recently by Gerdjikov, Mikhailov, and Valchev (GMV system). We discuss the
...
...

References

SHOWING 1-10 OF 33 REFERENCES
Reductions of integrable equations on A.III-type symmetric spaces
We study a class of integrable nonlinear differential equations related to the A.III-type symmetric spaces. These spaces are realized as factor groups of the form SU(N)/S(U(N − k) × U(k)). We use the
Reductions of integrable equations: dihedral group
We discuss the algebraic and analytic structure of rational Lax operators. With algebraic reductions of Lax equations we associate a reduction group—a group of automorphisms of the corresponding
Reduction Groups and Automorphic Lie Algebras
We study a new class of infinite dimensional Lie algebras, which has important applications to the theory of integrable equations. The construction of these algebras is very similar to the one for
The generating operator for the n × n linear system
Differential Geometry, Lie Groups, and Symmetric Spaces
Elementary differential geometry Lie groups and Lie algebras Structure of semisimple Lie algebras Symmetric spaces Decomposition of symmetric spaces Symmetric spaces of the noncompact type Symmetric
On Spectral Theory of Lax Operators on Symmetric Spaces: Vanishing Versus Constant Boundary Conditions
We outline several specific issues concerning the theory of multicomponent nonlinear Schrodinger equations with vanishing and constant boundary conditions. We start with the spectral properties of
Gauge covariant formulation of the generating operator. 2. Systems on homogeneous spaces
On construction of recursion operators from Lax representation
TLDR
In this work, a general procedure for constructing the recursion operators for nonlinear integrable equations admitting Lax representation is developed and the recursions operators for some KdV-type systems of integrability equations are found.
Generalised Fourier transforms for the soliton equations. Gauge-covariant formulation
The direct and the inverse scattering problems for the generalised Zakharov-Shabat spectral problem L related to a given semi-simple Lie algebra are solved. The fundamental analytic solutions and the
Lenard scheme for two-dimensional periodic Volterra chain
We prove that for compatible weakly nonlocal Hamiltonian and symplectic operators, hierarchies of infinitely many commuting local symmetries and conservation laws can be generated under some easily
...
...