Applications of Lie algebras to hyperbolic and stochastic differential equations
Author(s)
Bibliographic Information
Applications of Lie algebras to hyperbolic and stochastic differential equations
(Mathematics and its applications, v. 466)
Kluwer Academic Publishers, c1999
- : hb : alk. paper
Available at / 17 libraries
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
: hb : alk. paperVAR||13||199024017
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Hiroshima University Central Library, Interlibrary Loan
: hb : alk. paper411.68:V-43/HL4010004000409251
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Note
Includes bibliographical references (p.235-236) and index
Description and Table of Contents
Description
The main part of the book is based on a one semester graduate course for students in mathematics. I have attempted to develop the theory of hyperbolic systems of differen tial equations in a systematic way, making as much use as possible ofgradient systems and their algebraic representation. However, despite the strong sim ilarities between the development of ideas here and that found in a Lie alge bras course this is not a book on Lie algebras. The order of presentation has been determined mainly by taking into account that algebraic representation and homomorphism correspondence with a full rank Lie algebra are the basic tools which require a detailed presentation. I am aware that the inclusion of the material on algebraic and homomorphism correspondence with a full rank Lie algebra is not standard in courses on the application of Lie algebras to hyperbolic equations. I think it should be. Moreover, the Lie algebraic structure plays an important role in integral representation for solutions of nonlinear control systems and stochastic differential equations yelding results that look quite different in their original setting. Finite-dimensional nonlin ear filters for stochastic differential equations and, say, decomposability of a nonlinear control system receive a common understanding in this framework.
Table of Contents
Preface. Introduction. 1. Gradient Systems in a Lie Algebra. 2. Representation of a Gradient System. 3. F.G.O. Lie Algebras. 4. Applications. 5. Stabilization and Related Problems. Appendix. References. Subject Index.
by "Nielsen BookData"