Algebraic theory of differential equations
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Algebraic theory of differential equations
(London Mathematical Society lecture note series, 357)
Cambridge University Press, 2009
- : pbk
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Includes bibliographical references
Description and Table of Contents
Description
Integration of differential equations is a central problem in mathematics and several approaches have been developed by studying analytic, algebraic, and algorithmic aspects of the subject. One of these is Differential Galois Theory, developed by Kolchin and his school, and another originates from the Soliton Theory and Inverse Spectral Transform method, which was born in the works of Kruskal, Zabusky, Gardner, Green and Miura. Many other approaches have also been developed, but there has so far been no intersection between them. This unique introduction to the subject finally brings them together, with the aim of initiating interaction and collaboration between these various mathematical communities. The collection includes a LMS Invited Lecture Course by Michael F. Singer, together with some shorter lecture courses and review articles, all based upon a mini-programme held at the International Centre for Mathematical Sciences (ICMS) in Edinburgh.
Table of Contents
- Preface
- 1. Galois theory of linear differential equations Michael F. Singer
- 2. Solving in closed form Felix Ulmer and Jacques-Arthur Weil
- 3. Factorization of linear systems Sergey P. Tsarev
- 4. Introduction to D-modules Anton Leykin
- 5. Symbolic representation and classification of integrable systems A. V. Mikhailov, V. S. Novikov and Jing Ping Wang
- 6. Searching for integrable (P)DEs Jarmo Hietarinta
- 7. Around differential Galois theory Anand Pillay.
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