The Problem of Integrable Discretization: Hamiltonian Approach [electronic resource] /
The book explores the theory of discrete integrable systems, with an emphasis on the following general problem: how to discretize one or several of independent variables in a given integrable system of differential equations, maintaining the integrability property? This question (related in spirit to such a modern branch of numerical analysis as geometric integration) is treated in the book as an immanent part of the theory of integrable systems, also commonly termed as the theory of solitons. Among several possible approaches to this theory, the Hamiltonian one is chosen as the guiding principle. A self-contained exposition of the Hamiltonian (r-matrix, or "Leningrad") approach to integrable systems is given, culminating in the formulation of a general recipe for integrable discretization of r-matrix hierarchies. After that, a detailed systematic study is carried out for the majority of known discrete integrable systems which can be considered as discretizations of integrable ordinary differential or differential-difference (lattice) equations. This study includes, in all cases, a unified treatment of the correspondent continuous integrable systems as well. The list of systems treated in the book includes, among others: Toda and Volterra lattices along with their numerous generalizations (relativistic, multi-field, Lie-algebraic, etc.), Ablowitz-Ladik hierarchy, peakons of the Camassa-Holm equation, Garnier and Neumann systems with their various relatives, many-body systems of the Calogero-Moser and Ruijsenaars-Schneider type, various integrable cases of the rigid body dynamics. Most of the results are only available from recent journal publications, many of them are new. Thus, the book is a kind of encyclopedia on discrete integrable systems. It unifies the features of a research monograph and a handbook. It is supplied with an extensive bibliography and detailed bibliographic remarks at the end of each chapter. Largely self-contained, it will be accessible to graduate and post-graduate students as well as to researchers in the area of integrable dynamical systems. Also those involved in real numerical calculations or modelling with integrable systems will find it very helpful.
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Format: | Texto biblioteca |
Language: | eng |
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Basel : Birkhäuser Basel : Imprint: Birkhäuser,
2003
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Subjects: | Mathematics., Algebra., Ordered algebraic structures., Dynamics., Ergodic theory., Computer mathematics., Physics., Solid state physics., Order, Lattices, Ordered Algebraic Structures., Dynamical Systems and Ergodic Theory., Computational Mathematics and Numerical Analysis., Theoretical, Mathematical and Computational Physics., Numerical and Computational Physics., Solid State Physics., |
Online Access: | http://dx.doi.org/10.1007/978-3-0348-8016-9 |
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Mathematics. Algebra. Ordered algebraic structures. Dynamics. Ergodic theory. Computer mathematics. Physics. Solid state physics. Mathematics. Order, Lattices, Ordered Algebraic Structures. Dynamical Systems and Ergodic Theory. Computational Mathematics and Numerical Analysis. Theoretical, Mathematical and Computational Physics. Numerical and Computational Physics. Solid State Physics. Mathematics. Algebra. Ordered algebraic structures. Dynamics. Ergodic theory. Computer mathematics. Physics. Solid state physics. Mathematics. Order, Lattices, Ordered Algebraic Structures. Dynamical Systems and Ergodic Theory. Computational Mathematics and Numerical Analysis. Theoretical, Mathematical and Computational Physics. Numerical and Computational Physics. Solid State Physics. |
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Mathematics. Algebra. Ordered algebraic structures. Dynamics. Ergodic theory. Computer mathematics. Physics. Solid state physics. Mathematics. Order, Lattices, Ordered Algebraic Structures. Dynamical Systems and Ergodic Theory. Computational Mathematics and Numerical Analysis. Theoretical, Mathematical and Computational Physics. Numerical and Computational Physics. Solid State Physics. Mathematics. Algebra. Ordered algebraic structures. Dynamics. Ergodic theory. Computer mathematics. Physics. Solid state physics. Mathematics. Order, Lattices, Ordered Algebraic Structures. Dynamical Systems and Ergodic Theory. Computational Mathematics and Numerical Analysis. Theoretical, Mathematical and Computational Physics. Numerical and Computational Physics. Solid State Physics. Suris, Yuri B. author. SpringerLink (Online service) The Problem of Integrable Discretization: Hamiltonian Approach [electronic resource] / |
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The book explores the theory of discrete integrable systems, with an emphasis on the following general problem: how to discretize one or several of independent variables in a given integrable system of differential equations, maintaining the integrability property? This question (related in spirit to such a modern branch of numerical analysis as geometric integration) is treated in the book as an immanent part of the theory of integrable systems, also commonly termed as the theory of solitons. Among several possible approaches to this theory, the Hamiltonian one is chosen as the guiding principle. A self-contained exposition of the Hamiltonian (r-matrix, or "Leningrad") approach to integrable systems is given, culminating in the formulation of a general recipe for integrable discretization of r-matrix hierarchies. After that, a detailed systematic study is carried out for the majority of known discrete integrable systems which can be considered as discretizations of integrable ordinary differential or differential-difference (lattice) equations. This study includes, in all cases, a unified treatment of the correspondent continuous integrable systems as well. The list of systems treated in the book includes, among others: Toda and Volterra lattices along with their numerous generalizations (relativistic, multi-field, Lie-algebraic, etc.), Ablowitz-Ladik hierarchy, peakons of the Camassa-Holm equation, Garnier and Neumann systems with their various relatives, many-body systems of the Calogero-Moser and Ruijsenaars-Schneider type, various integrable cases of the rigid body dynamics. Most of the results are only available from recent journal publications, many of them are new. Thus, the book is a kind of encyclopedia on discrete integrable systems. It unifies the features of a research monograph and a handbook. It is supplied with an extensive bibliography and detailed bibliographic remarks at the end of each chapter. Largely self-contained, it will be accessible to graduate and post-graduate students as well as to researchers in the area of integrable dynamical systems. Also those involved in real numerical calculations or modelling with integrable systems will find it very helpful. |
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Mathematics. Algebra. Ordered algebraic structures. Dynamics. Ergodic theory. Computer mathematics. Physics. Solid state physics. Mathematics. Order, Lattices, Ordered Algebraic Structures. Dynamical Systems and Ergodic Theory. Computational Mathematics and Numerical Analysis. Theoretical, Mathematical and Computational Physics. Numerical and Computational Physics. Solid State Physics. |
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Suris, Yuri B. author. SpringerLink (Online service) |
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Suris, Yuri B. author. SpringerLink (Online service) |
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Suris, Yuri B. author. |
title |
The Problem of Integrable Discretization: Hamiltonian Approach [electronic resource] / |
title_short |
The Problem of Integrable Discretization: Hamiltonian Approach [electronic resource] / |
title_full |
The Problem of Integrable Discretization: Hamiltonian Approach [electronic resource] / |
title_fullStr |
The Problem of Integrable Discretization: Hamiltonian Approach [electronic resource] / |
title_full_unstemmed |
The Problem of Integrable Discretization: Hamiltonian Approach [electronic resource] / |
title_sort |
problem of integrable discretization: hamiltonian approach [electronic resource] / |
publisher |
Basel : Birkhäuser Basel : Imprint: Birkhäuser, |
publishDate |
2003 |
url |
http://dx.doi.org/10.1007/978-3-0348-8016-9 |
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AT surisyuribauthor theproblemofintegrablediscretizationhamiltonianapproachelectronicresource AT springerlinkonlineservice theproblemofintegrablediscretizationhamiltonianapproachelectronicresource AT surisyuribauthor problemofintegrablediscretizationhamiltonianapproachelectronicresource AT springerlinkonlineservice problemofintegrablediscretizationhamiltonianapproachelectronicresource |
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1756263296564985856 |
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KOHA-OAI-TEST:1702982018-07-30T22:47:01ZThe Problem of Integrable Discretization: Hamiltonian Approach [electronic resource] / Suris, Yuri B. author. SpringerLink (Online service) textBasel : Birkhäuser Basel : Imprint: Birkhäuser,2003.engThe book explores the theory of discrete integrable systems, with an emphasis on the following general problem: how to discretize one or several of independent variables in a given integrable system of differential equations, maintaining the integrability property? This question (related in spirit to such a modern branch of numerical analysis as geometric integration) is treated in the book as an immanent part of the theory of integrable systems, also commonly termed as the theory of solitons. Among several possible approaches to this theory, the Hamiltonian one is chosen as the guiding principle. A self-contained exposition of the Hamiltonian (r-matrix, or "Leningrad") approach to integrable systems is given, culminating in the formulation of a general recipe for integrable discretization of r-matrix hierarchies. After that, a detailed systematic study is carried out for the majority of known discrete integrable systems which can be considered as discretizations of integrable ordinary differential or differential-difference (lattice) equations. This study includes, in all cases, a unified treatment of the correspondent continuous integrable systems as well. The list of systems treated in the book includes, among others: Toda and Volterra lattices along with their numerous generalizations (relativistic, multi-field, Lie-algebraic, etc.), Ablowitz-Ladik hierarchy, peakons of the Camassa-Holm equation, Garnier and Neumann systems with their various relatives, many-body systems of the Calogero-Moser and Ruijsenaars-Schneider type, various integrable cases of the rigid body dynamics. Most of the results are only available from recent journal publications, many of them are new. Thus, the book is a kind of encyclopedia on discrete integrable systems. It unifies the features of a research monograph and a handbook. It is supplied with an extensive bibliography and detailed bibliographic remarks at the end of each chapter. Largely self-contained, it will be accessible to graduate and post-graduate students as well as to researchers in the area of integrable dynamical systems. Also those involved in real numerical calculations or modelling with integrable systems will find it very helpful.I General Theory -- 1 Hamiltonian Mechanics -- 2 R-matrix Hierarchies -- II Lattice Systems -- 3 Toda Lattice -- 4 Volterra Lattice -- 5 Newtonian Equations of the Toda Type -- 6 Relativistic Toda Lattice -- 7 Relativistic Volterra Lattice -- 8 Newtonian Equations of the Relativistic Toda Type -- 9 Explicit Discretizations for Toda Systems -- 10 Explicit Discretizations of Newtonian Toda Systems -- 11 Bruschi-Ragnisco Lattice -- 12 Multi-field Toda-like Systems -- 13 Multi-field Relativistic Toda Systems -- 14 Belov-Chaltikian Lattices -- 15 Multi-field Volterra-like Systems -- 16 Multi-field Relativistic Volterra Systems -- 17 Bogoyavlensky Lattices -- 18 Ablowitz-Ladik Hierarchy -- III Systems of Classical Mechanics -- 19 Peakons System -- 20 Standard-like Discretizations -- 21 Lie-algebraic Toda Systems -- 22 Gamier System -- 23 Hénon-Heiles System -- 24 Neumann System -- 25 Lie-algebraic Generalizations of the Gamier Systems -- List of Notations.The book explores the theory of discrete integrable systems, with an emphasis on the following general problem: how to discretize one or several of independent variables in a given integrable system of differential equations, maintaining the integrability property? This question (related in spirit to such a modern branch of numerical analysis as geometric integration) is treated in the book as an immanent part of the theory of integrable systems, also commonly termed as the theory of solitons. Among several possible approaches to this theory, the Hamiltonian one is chosen as the guiding principle. A self-contained exposition of the Hamiltonian (r-matrix, or "Leningrad") approach to integrable systems is given, culminating in the formulation of a general recipe for integrable discretization of r-matrix hierarchies. After that, a detailed systematic study is carried out for the majority of known discrete integrable systems which can be considered as discretizations of integrable ordinary differential or differential-difference (lattice) equations. This study includes, in all cases, a unified treatment of the correspondent continuous integrable systems as well. The list of systems treated in the book includes, among others: Toda and Volterra lattices along with their numerous generalizations (relativistic, multi-field, Lie-algebraic, etc.), Ablowitz-Ladik hierarchy, peakons of the Camassa-Holm equation, Garnier and Neumann systems with their various relatives, many-body systems of the Calogero-Moser and Ruijsenaars-Schneider type, various integrable cases of the rigid body dynamics. Most of the results are only available from recent journal publications, many of them are new. Thus, the book is a kind of encyclopedia on discrete integrable systems. It unifies the features of a research monograph and a handbook. It is supplied with an extensive bibliography and detailed bibliographic remarks at the end of each chapter. Largely self-contained, it will be accessible to graduate and post-graduate students as well as to researchers in the area of integrable dynamical systems. Also those involved in real numerical calculations or modelling with integrable systems will find it very helpful.Mathematics.Algebra.Ordered algebraic structures.Dynamics.Ergodic theory.Computer mathematics.Physics.Solid state physics.Mathematics.Order, Lattices, Ordered Algebraic Structures.Dynamical Systems and Ergodic Theory.Computational Mathematics and Numerical Analysis.Theoretical, Mathematical and Computational Physics.Numerical and Computational Physics.Solid State Physics.Springer eBookshttp://dx.doi.org/10.1007/978-3-0348-8016-9URN:ISBN:9783034880169 |