A New Super Extension of Dirac Hierarchy

Abstract and Applied Analysis ◽

10.1155/2014/472101 ◽

2014 ◽

Vol 2014 ◽

pp. 1-6 ◽

Cited By ~ 2

Author(s):

Jiao Zhang ◽

Fucai You ◽

Yan Zhao

Keyword(s):

Spectral Problem ◽

Integrable Hierarchy ◽

Trace Identity ◽

Hamiltonian Structures ◽

Curvature Equation ◽

Zero Curvature

We derive a new super extension of the Dirac hierarchy associated with a3×3matrix super spectral problem with the help of the zero-curvature equation. Super trace identity is used to furnish the super Hamiltonian structures for the resulting nonlinear super integrable hierarchy.

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On Construction of a Super Hierarchy of the Wadati-Konno-Ichikawa Equation

Advances in Mathematical Physics ◽

10.1155/2020/6838731 ◽

2020 ◽

Vol 2020 ◽

pp. 1-7

Author(s):

Xuemei Li ◽

Lutong Li

Keyword(s):

Spectral Problem ◽

Spectral Parameter ◽

Trace Identity ◽

Hamiltonian Structures ◽

Curvature Equation ◽

Zero Curvature ◽

Matrix Spectral Problem

In this paper, a super Wadati-Konno-Ichikawa (WKI) hierarchy associated with a 3×3 matrix spectral problem is derived with the help of the zero-curvature equation. We obtain the super bi-Hamiltonian structures by using of the super trace identity. Infinitely, many conserved laws of the super WKI equation are constructed by using spectral parameter expansions.

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A Family of Integrable Differential-Difference Equations: Tri-Hamiltonian Structure and Lie Algebra of Vector Fields

Discrete Dynamics in Nature and Society ◽

10.1155/2021/9912387 ◽

2021 ◽

Vol 2021 ◽

pp. 1-9

Author(s):

Ning Zhang ◽

Xi-Xiang Xu

Keyword(s):

Spectral Problem ◽

Lie Algebra ◽

Difference Equations ◽

Vector Fields ◽

Hamiltonian Structure ◽

Trace Identity ◽

Zero Curvature Representation ◽

Curvature Equation ◽

Zero Curvature ◽

Liouville Integrable

Starting from a novel discrete spectral problem, a family of integrable differential-difference equations is derived through discrete zero curvature equation. And then, tri-Hamiltonian structure of the whole family is established by the discrete trace identity. It is shown that the obtained family is Liouville-integrable. Next, a nonisospectral integrable family associated with the discrete spectral problem is constructed through nonisospectral discrete zero curvature representation. Finally, Lie algebra of isospectral and nonisospectral vector fields is deduced.

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A Soliton Hierarchy Associated with a Spectral Problem of 2nd Degree in a Spectral Parameter and Its Bi-Hamiltonian Structure

Advances in Mathematical Physics ◽

10.1155/2016/3589704 ◽

2016 ◽

Vol 2016 ◽

pp. 1-6 ◽

Cited By ~ 2

Author(s):

Yuqin Yao ◽

Shoufeng Shen ◽

Wen-Xiu Ma

Keyword(s):

Conservation Laws ◽

Spectral Problem ◽

Spectral Parameter ◽

Hamiltonian Structure ◽

Trace Identity ◽

Liouville Integrability ◽

Hamiltonian Structures ◽

Zero Curvature ◽

Soliton Hierarchy ◽

Matrix Spectral Problem

Associated withso~(3,R), a new matrix spectral problem of 2nd degree in a spectral parameter is proposed and its corresponding soliton hierarchy is generated within the zero curvature formulation. Bi-Hamiltonian structures of the presented soliton hierarchy are furnished by using the trace identity, and thus, all presented equations possess infinitely commuting many symmetries and conservation laws, which implies their Liouville integrability.

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A nonisospectral integrable model of AKNS hierarchy and KN hierarchy, as well as its extended system

International Journal of Geometric Methods in Modern Physics ◽

10.1142/s0219887821501565 ◽

2021 ◽

pp. 2150156

Author(s):

Haifeng Wang ◽

Yufeng Zhang

Keyword(s):

Hamiltonian System ◽

Integrable Model ◽

Loop Algebra ◽

Integrable Hierarchy ◽

Trace Identity ◽

Extended System ◽

Akns Hierarchy ◽

Curvature Equation ◽

Zero Curvature ◽

Higher Dimensional

In this paper, we first introduce a nonisospectral problem associate with a loop algebra. Based on the nonisospectral problem, we deduce a nonisospectral integrable hierarchy by solving a nonisospectral zero curvature equation. It follows that the standard AKNS hierarchy and KN hierarchy are obtained by reducing the resulting nonisospectral hierarchy. Then, the Hamiltonian system of the resulting nonisospectral hierarchy is investigated based on the trace identity. Additionally, an extended integrable system of the resulting nonisospectral hierarchy is worked out based on an expanded higher-dimensional Loop algebra.

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SUPER INTEGRABLE HIERARCHY AND SUPER HAMILTONIAN STRUCTURES ASSOCIATED WITH GUO HIERARCHY

Modern Physics Letters B ◽

10.1142/s0217984909021545 ◽

2009 ◽

Vol 23 (29) ◽

pp. 3491-3496 ◽

Cited By ~ 1

Author(s):

NING ZHANG ◽

HUANHE DONG

Keyword(s):

Integrable Hierarchies ◽

Lie Superalgebra ◽

Integrable Hierarchy ◽

Hamiltonian Structures ◽

Curvature Equation ◽

Zero Curvature

A Lie superalgebra is constructed from which establishes an isospectral problems. By solving the zero curvature equation, a resulting super hierarchies of the Guo hierarchy are obtained. By making use of the super identity, the Hamiltonian structures of the above super integrable hierarchies are generated, this method can be used to other superhierarchy.

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Three-Component Generalisation of Burgers Equation and Its Bi-Hamiltonian Structures

Zeitschrift für Naturforschung A ◽

10.1515/zna-2016-0493 ◽

2017 ◽

Vol 72 (5) ◽

pp. 469-475

Author(s):

Wei Liu ◽

Xianguo Geng ◽

Bo Xue

Keyword(s):

Eigenvalue Problem ◽

Conservation Laws ◽

Spectral Parameter ◽

Burgers Equation ◽

Trace Identity ◽

Matrix Eigenvalue Problem ◽

Hamiltonian Structures ◽

Curvature Equation ◽

Matrix Eigenvalue ◽

Zero Curvature

AbstractA hierarchy of three-component generalisation of Burgers equation, which is associated with a 3×3 matrix eigenvalue problem, is generated by using the zero-curvature equation. By means of the trace identity, the bi-Hamiltonian structures of this hierarchy are constructed. Moreover, the infinite conservation laws for the hierarchy are obtained with the aid of spectral parameter expansion.

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New hierarchy of integrable nonlinear differential-difference equations

Modern Physics Letters B ◽

10.1142/s0217984915501900 ◽

2015 ◽

Vol 29 (31) ◽

pp. 1550190

Author(s):

Xianguo Geng ◽

Liang Guan ◽

Bo Xue

Keyword(s):

Conservation Laws ◽

Spectral Problem ◽

Spectral Parameter ◽

Difference Equations ◽

Trace Identity ◽

Hamiltonian Structures ◽

Zero Curvature ◽

Matrix Spectral Problem

A hierarchy of integrable nonlinear differential-difference equations associated with a discrete [Formula: see text] matrix spectral problem is proposed based on the discrete zero-curvature equations. Then, Hamiltonian structures for this hierarchy are constructed with the aid of the trace identity. Infinitely many conservation laws of the hierarchy are derived by means of spectral parameter expansions.

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TWO FAMILIES GENERALIZATION OF AKNS HIERARCHIES AND THEIR HAMILTONIAN STRUCTURES

Modern Physics Letters B ◽

10.1142/s021798491002286x ◽

2010 ◽

Vol 24 (08) ◽

pp. 791-805 ◽

Cited By ~ 4

Author(s):

YUNHU WANG ◽

XIANGQIAN LIANG ◽

HUI WANG

Keyword(s):

Lie Algebra ◽

Hamiltonian Structures ◽

Curvature Equation ◽

Zero Curvature

By means of the Lie algebra G1, we construct an extended Lie algebra G2. Two different isospectral problems are designed by the two different Lie algebra G1 and G2. With the help of the variational identity and the zero curvature equation, two families generalization of the AKNS hierarchies and their Hamiltonian structures are obtained, respectively.

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An extension of the coupled derivative nonlinear Schrödinger hierarchy

Modern Physics Letters B ◽

10.1142/s0217984918500161 ◽

2018 ◽

Vol 32 (02) ◽

pp. 1850016

Author(s):

Siqi Xu ◽

Xianguo Geng ◽

Bo Xue

Keyword(s):

Conservation Laws ◽

Spectral Problem ◽

Compatibility Condition ◽

Evolution Equations ◽

Nonlinear Evolution ◽

Nonlinear Evolution Equations ◽

Trace Identity ◽

Hamiltonian Structures ◽

Nonlinear Schrödinger ◽

Matrix Spectral Problem

In this paper, a 3 × 3 matrix spectral problem with six potentials is considered. With the help of the compatibility condition, a hierarchy of new nonlinear evolution equations which can be reduced to the coupled derivative nonlinear Schrödinger (CDNLS) equations is obtained. By use of the trace identity, it is proved that all the members in this new hierarchy have generalized bi-Hamiltonian structures. Moreover, infinitely many conservation laws of this hierarchy are constructed.

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A NEW LOOP ALGEBRA AND TWO NEW LIOUVILLE INTEGRABLE HIERARCHY

Modern Physics Letters B ◽

10.1142/s0217984907013109 ◽

2007 ◽

Vol 21 (11) ◽

pp. 663-673 ◽

Cited By ~ 3

Author(s):

HUAN-HE DONG

Keyword(s):

Quadratic Form ◽

Loop Algebra ◽

Integrable Hierarchy ◽

Trace Identity ◽

Hamiltonian Structures ◽

Liouville Integrable

A new loop algebra containing four arbitrary constants is presented, and the corresponding computing formula of constant γ in the quadratic-form identity is obtained in this paper, which can be reduced to a computing formula of constant γ in the trace identity. As application, two new Liouville integrable hierarchy and Hamiltonian structures are derived.

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