Meromorphic Functions over Non-Archimedean Fields: 522 (Mathematics and Its Applications) - Tapa dura

Pei-Chu Hu; Chung-Chun Yang

9780792365327: Meromorphic Functions over Non-Archimedean Fields: 522 (Mathematics and Its Applications)

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ISBN 10: 0792365321 ISBN 13: 9780792365327

Editorial: Springer, 2000

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Nevanlinna theory (or value distribution theory) in complex analysis is so beautiful that one would naturally be interested in determining how such a theory would look in the non� Archimedean analysis and Diophantine approximations. There are two "main theorems" and defect relations that occupy a central place in N evanlinna theory. They generate a lot of applications in studying uniqueness of meromorphic functions, global solutions of differential equations, dynamics, and so on. In this book, we will introduce non-Archimedean analogues of Nevanlinna theory and its applications. In value distribution theory, the main problem is that given a holomorphic curve f : C -+ M into a projective variety M of dimension n and a family 01 of hypersurfaces on M, under a proper condition of non-degeneracy on f, find the defect relation. If 01 n is a family of hyperplanes on M = r in general position and if the smallest dimension of linear subspaces containing the image f(C) is k, Cartan conjectured that the bound of defect relation is 2n - k + 1. Generally, if 01 is a family of admissible or normal crossings hypersurfaces, there are respectively Shiffman's conjecture and Griffiths-Lang's conjecture. Here we list the process of this problem: A. Complex analysis: (i) Constant targets: R. Nevanlinna[98] for n = k = 1; H. Cartan [20] for n = k > 1; E. I. Nochka [99], [100],[101] for n > k ~ 1; Shiffman's conjecture partially solved by Hu-Yang [71J; Griffiths-Lang's conjecture (open).

Rese�a del editor

This book introduces value distribution theory over non-Archimedean fields, starting with a survey of two Nevanlinna-type main theorems and defect relations for meromorphic functions and holomorphic curves. Secondly, it gives applications of the above theory to, e.g., abc-conjecture, Waring's problem, uniqueness theorems for meromorphic functions, and Malmquist-type theorems for differential equations over non-Archimedean fields. Next, iteration theory of rational and entire functions over non-Archimedean fields and Schmidt's subspace theorems are studied. Finally, the book suggests some new problems for further research. Audience: This work will be of interest to graduate students working in complex or diophantine approximation as well as to researchers involved in the fields of analysis, complex function theory of one or several variables, and analytic spaces.

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EditorialSpringer
A�o de publicaci�n2000
ISBN 10 0792365321
ISBN 13 9780792365327
Encuadernaci�nTapa dura
IdiomaIngl�s
N�mero de p�ginas308

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Meromorphic Functions over Non-Archimedean Fields (Mathematics and Its Applications, 522)

Pei-Chu Hu; Chung-Chun Yang

Publicado por Springer, 2000

ISBN 10: 0792365321 ISBN 13: 9780792365327

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Meromorphic Functions over Non-Archimedean Fields

Hu, Pei-Chu; Yang, Chung-Chun

Publicado por Springer, 2000

ISBN 10: 0792365321 ISBN 13: 9780792365327

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Meromorphic Functions over Non-Archimedean Fields

Chung-Chun Yang

Publicado por Springer Netherlands Sep 2000, 2000

ISBN 10: 0792365321 ISBN 13: 9780792365327

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Buch. Condici�n: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -Nevanlinna theory (or value distribution theory) in complex analysis is so beautiful that one would naturally be interested in determining how such a theory would look in the non Archimedean analysis and Diophantine approximations. There are two 'main theorems' and defect relations that occupy a central place in N evanlinna theory. They generate a lot of applications in studying uniqueness of meromorphic functions, global solutions of differential equations, dynamics, and so on. In this book, we will introduce non-Archimedean analogues of Nevanlinna theory and its applications. In value distribution theory, the main problem is that given a holomorphic curve f : C -+ M into a projective variety M of dimension n and a family 01 of hypersurfaces on M, under a proper condition of non-degeneracy on f, find the defect relation. If 01 n is a family of hyperplanes on M = r in general position and if the smallest dimension of linear subspaces containing the image f(C) is k, Cartan conjectured that the bound of defect relation is 2n - k + 1. Generally, if 01 is a family of admissible or normal crossings hypersurfaces, there are respectively Shiffman's conjecture and Griffiths-Lang's conjecture. Here we list the process of this problem: A. Complex analysis: (i) Constant targets: R. Nevanlinna[98] for n = k = 1; H. Cartan [20] for n = k 1; E. I. Nochka [99], [100],[101] for n k ~ 1; Shiffman's conjecture partially solved by Hu-Yang [71J; Griffiths-Lang's conjecture (open). 308 pp. Englisch. N� de ref. del art�culo: 9780792365327

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Meromorphic Functions over Non-Archimedean Fields

Hu, Pei-Chu; Yang, Chung-Chun

Publicado por Springer, 2000

ISBN 10: 0792365321 ISBN 13: 9780792365327

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Meromorphic Functions over Non-Archimedean Fields

Chung-Chun Yang

Publicado por Springer Netherlands, Springer Netherlands, 2000

ISBN 10: 0792365321 ISBN 13: 9780792365327

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Buch. Condici�n: Neu. Druck auf Anfrage Neuware - Printed after ordering - Nevanlinna theory (or value distribution theory) in complex analysis is so beautiful that one would naturally be interested in determining how such a theory would look in the non Archimedean analysis and Diophantine approximations. There are two 'main theorems' and defect relations that occupy a central place in N evanlinna theory. They generate a lot of applications in studying uniqueness of meromorphic functions, global solutions of differential equations, dynamics, and so on. In this book, we will introduce non-Archimedean analogues of Nevanlinna theory and its applications. In value distribution theory, the main problem is that given a holomorphic curve f : C -+ M into a projective variety M of dimension n and a family 01 of hypersurfaces on M, under a proper condition of non-degeneracy on f, find the defect relation. If 01 n is a family of hyperplanes on M = r in general position and if the smallest dimension of linear subspaces containing the image f(C) is k, Cartan conjectured that the bound of defect relation is 2n - k + 1. Generally, if 01 is a family of admissible or normal crossings hypersurfaces, there are respectively Shiffman's conjecture and Griffiths-Lang's conjecture. Here we list the process of this problem: A. Complex analysis: (i) Constant targets: R. Nevanlinna[98] for n = k = 1; H. Cartan [20] for n = k 1; E. I. Nochka [99], [100],[101] for n k ~ 1; Shiffman's conjecture partially solved by Hu-Yang [71J; Griffiths-Lang's conjecture (open). N� de ref. del art�culo: 9780792365327

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Meromorphic Functions over Non-Archimedean Fields

Pei-Chu Hu

Publicado por Springer, 2000

ISBN 10: 0792365321 ISBN 13: 9780792365327

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Hardback. Condici�n: New. This item is printed on demand. New copy - Usually dispatched within 5-9 working days 639. N� de ref. del art�culo: C9780792365327

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