Algebraic Aspects of Integrable Systems

Algebraic Aspects of Integrable Systems
Title Algebraic Aspects of Integrable Systems PDF eBook
Author A.S. Fokas
Publisher Springer Science & Business Media
Pages 352
Release 2012-12-06
Genre Mathematics
ISBN 1461224349

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A collection of articles in memory of Irene Dorfman and her research in mathematical physics. Among the topics covered are: the Hamiltonian and bi-Hamiltonian nature of continuous and discrete integrable equations; the t-function construction; the r-matrix formulation of integrable systems; pseudo-differential operators and modular forms; master symmetries and the Bocher theorem; asymptotic integrability; the integrability of the equations of associativity; invariance under Laplace-darboux transformations; trace formulae of the Dirac and Schrodinger periodic operators; and certain canonical 1-forms.

Algebraic and Geometric Aspects of Integrable Systems and Random Matrices

Algebraic and Geometric Aspects of Integrable Systems and Random Matrices
Title Algebraic and Geometric Aspects of Integrable Systems and Random Matrices PDF eBook
Author Anton Dzhamay
Publisher American Mathematical Soc.
Pages 363
Release 2013-06-26
Genre Mathematics
ISBN 0821887475

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This volume contains the proceedings of the AMS Special Session on Algebraic and Geometric Aspects of Integrable Systems and Random Matrices, held from January 6-7, 2012, in Boston, MA. The very wide range of topics represented in this volume illustrates

Algebraic Integrability of Nonlinear Dynamical Systems on Manifolds

Algebraic Integrability of Nonlinear Dynamical Systems on Manifolds
Title Algebraic Integrability of Nonlinear Dynamical Systems on Manifolds PDF eBook
Author A.K. Prykarpatsky
Publisher Springer
Pages 559
Release 2012-10-10
Genre Science
ISBN 9789401060967

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In recent times it has been stated that many dynamical systems of classical mathematical physics and mechanics are endowed with symplectic structures, given in the majority of cases by Poisson brackets. Very often such Poisson structures on corresponding manifolds are canonical, which gives rise to the possibility of producing their hidden group theoretical essence for many completely integrable dynamical systems. It is a well understood fact that great part of comprehensive integrability theories of nonlinear dynamical systems on manifolds is based on Lie-algebraic ideas, by means of which, in particular, the classification of such compatibly bi Hamiltonian and isospectrally Lax type integrable systems has been carried out. Many chapters of this book are devoted to their description, but to our regret so far the work has not been completed. Hereby our main goal in each analysed case consists in separating the basic algebraic essence responsible for the complete integrability, and which is, at the same time, in some sense universal, i. e. , characteristic for all of them. Integrability analysis in the framework of a gradient-holonomic algorithm, devised in this book, is fulfilled through three stages: 1) finding a symplectic structure (Poisson bracket) transforming an original dynamical system into a Hamiltonian form; 2) finding first integrals (action variables or conservation laws); 3) defining an additional set of variables and some functional operator quantities with completely controlled evolutions (for instance, as Lax type representation).

Integrable Systems

Integrable Systems
Title Integrable Systems PDF eBook
Author N.J. Hitchin
Publisher Oxford University Press, USA
Pages 148
Release 2013-03-14
Genre Mathematics
ISBN 0199676771

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Designed to give graduate students an understanding of integrable systems via the study of Riemann surfaces, loop groups, and twistors, this book has its origins in a lecture series given by the internationally renowned authors. Written in an accessible, informal style, it fills a gap in the existing literature.

Integrability of Dynamical Systems: Algebra and Analysis

Integrability of Dynamical Systems: Algebra and Analysis
Title Integrability of Dynamical Systems: Algebra and Analysis PDF eBook
Author Xiang Zhang
Publisher Springer
Pages 390
Release 2017-03-30
Genre Mathematics
ISBN 9811042268

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This is the first book to systematically state the fundamental theory of integrability and its development of ordinary differential equations with emphasis on the Darboux theory of integrability and local integrability together with their applications. It summarizes the classical results of Darboux integrability and its modern development together with their related Darboux polynomials and their applications in the reduction of Liouville and elementary integrabilty and in the center—focus problem, the weakened Hilbert 16th problem on algebraic limit cycles and the global dynamical analysis of some realistic models in fields such as physics, mechanics and biology. Although it can be used as a textbook for graduate students in dynamical systems, it is intended as supplementary reading for graduate students from mathematics, physics, mechanics and engineering in courses related to the qualitative theory, bifurcation theory and the theory of integrability of dynamical systems.

Algebraic Integrability, Painlevé Geometry and Lie Algebras

Algebraic Integrability, Painlevé Geometry and Lie Algebras
Title Algebraic Integrability, Painlevé Geometry and Lie Algebras PDF eBook
Author Mark Adler
Publisher Springer Science & Business Media
Pages 487
Release 2013-03-14
Genre Mathematics
ISBN 366205650X

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This Ergebnisse volume is aimed at a wide readership of mathematicians and physicists, graduate students and professionals. The main thrust of the book is to show how algebraic geometry, Lie theory and Painlevé analysis can be used to explicitly solve integrable differential equations and construct the algebraic tori on which they linearize; at the same time, it is, for the student, a playing ground to applying algebraic geometry and Lie theory. The book is meant to be reasonably self-contained and presents numerous examples. The latter appear throughout the text to illustrate the ideas, and make up the core of the last part of the book. The first part of the book contains the basic tools from Lie groups, algebraic and differential geometry to understand the main topic.

From Quantum Cohomology to Integrable Systems

From Quantum Cohomology to Integrable Systems
Title From Quantum Cohomology to Integrable Systems PDF eBook
Author Martin A. Guest
Publisher OUP Oxford
Pages 336
Release 2008-03-13
Genre Mathematics
ISBN 0191606960

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Quantum cohomology has its origins in symplectic geometry and algebraic geometry, but is deeply related to differential equations and integrable systems. This text explains what is behind the extraordinary success of quantum cohomology, leading to its connections with many existing areas of mathematics as well as its appearance in new areas such as mirror symmetry. Certain kinds of differential equations (or D-modules) provide the key links between quantum cohomology and traditional mathematics; these links are the main focus of the book, and quantum cohomology and other integrable PDEs such as the KdV equation and the harmonic map equation are discussed within this unified framework. Aimed at graduate students in mathematics who want to learn about quantum cohomology in a broad context, and theoretical physicists who are interested in the mathematical setting, the text assumes basic familiarity with differential equations and cohomology.