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Painlevé Equations Through Symmetry Panruve Hōteishiki. English

معرفی کتاب «Painlevé Equations Through Symmetry Panruve Hōteishiki. English» نوشتهٔ Masatoshi Noumi; translated by Masatoshi Noumi، منتشرشده توسط نشر American Mathematical Society در سال 2004. این کتاب در فرمت djvu، زبان انگلیسی ارائه شده است.

``The Painleve equations themselves are really a wonder. They still continue to give us fresh mysteries ... One reason that I wrote this book is to tell you how impressed I am by the mysteries of the Painleve equations.'' --from the Preface The six Painleve equations (nonlinear ordinary differential equations of the second order with nonmovable singularities) have attracted the attention of mathematicians for more than 100 years. These equations and their solutions, the Painleve transcendents, nowadays play an important role in many areas of mathematics, such as the theory of special functions, the theory of integrable systems, differential geometry, and mathematical aspects of quantum field theory. The present book is devoted to the symmetry of Painleve equations (especially those of types II and IV). The author studies families of transformations for several types of Painleve equations--the so-called Backlund transformations--which transform solutions of a given Painleve equation to solutions of the same equation with a different set of parameters. It turns out that these symmetries can be interpreted in terms of root systems associated to affine Weyl groups. The author describes the remarkable combinatorial structures of these symmetries, and shows how they are related to the theory of $\tau$-functions associated to integrable systems. Prerequisites include undergraduate calculus and linear algebra with some knowledge of group theory. The book is suitable for graduate students and research mathematicians interested in special functions and the theory of integrable systems The six Painlevé equations (nonlinear ordinary differential equations of the second order with nonmovable singularities) have attracted the attention of mathematicians for more than a hundred years. These equations and their solutions (Painlevé transcendents) nowadays play an important role in many areas of mathematics, such as the theory of special functions, the theory of integrable systems, differential geometry, and mathematical aspects of quantum field theory. The present book is devoted to one of the aspects of the theory of Painlevé equations, namely to their symmetry properties. For several types of Painlevé equations (especially equations of types II and IV), the author studies families of transformations—the so-called Bäcklund transformations—which transform solutions of a given Painlevé equations to solutions of the same equations with a different set of parameters. It turns out that these symmetries can be interpreted in terms of root systems associated to affine Weyl groups. The author describes remarkable combinatorial structures of these symmetries and shows how they are related to the theory of $\tau$-functions associated to integrable systems. This book is a gentle introduction to the subject of Painlev equations. It is intended to serve as an introduction to the subject for readers with basic familiarity with calculus, linear algebra, and group theory, which means it is well suited for an undergraduate course. The focus is extremely narrow in the sense that the broader mathematical sign The six Painleve equations have attracted the attention of mathematicians. This book deals with the symmetry of Painleve equations. It studies families of transformations for several types of Painleve equations which transform solutions of a given Painleve equation to solutions of the same equation with a different set of parameters. Content: What is a Backlund transformation? The symmetric form $\tau$-functions $\tau$-functions on the lattice Jacobi-Trudi formula Getting familiar with determinants Gauss decomposition and birational transformations Lax formalism Appendix Bibliography Index. Masatoshi Noumi ; Translated By Masatoshi Noumi. Includes Bibliographical References (p. 153-154) And Index.
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