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Riemann surfaces and algebraic curve...

Cavalieri, Renzo, (1976-)

Riemann surfaces and algebraic curves[electronic resource] :a first course in Hurwitz theory /

紀錄類型:	書目-電子資源 : Monograph/item
杜威分類號:	515.93
書名/作者:	Riemann surfaces and algebraic curves : a first course in Hurwitz theory // Renzo Cavalieri, Eric Miles.
作者:	Cavalieri, Renzo,
其他作者:	Miles, Eric
出版者:	New York : : Cambridge University Press,, 2016.
面頁冊數:	xii, 183 p. : : ill., digital ;; 24 cm.
標題:	Riemann surfaces.
標題:	Curves, Algebraic.
標題:	Geometry, Algebraic.
ISBN:	9781316569252
ISBN:	9781107149243
ISBN:	9781316603529
摘要、提要註:	Hurwitz theory, the study of analytic functions among Riemann surfaces, is a classical field and active research area in algebraic geometry. The subject's interplay between algebra, geometry, topology and analysis is a beautiful example of the interconnectedness of mathematics. This book introduces students to this increasingly important field, covering key topics such as manifolds, monodromy representations and the Hurwitz potential. Designed for undergraduate study, this classroom-tested text includes over 100 exercises to provide motivation for the reader. Also included are short essays by guest writers on how they use Hurwitz theory in their work, which ranges from string theory to non-Archimedean geometry. Whether used in a course or as a self-contained reference for graduate students, this book will provide an exciting glimpse at mathematics beyond the standard university classes.
電子資源:	https://doi.org/10.1017/CBO9781316569252

Riemann surfaces and algebraic curves[electronic resource] :a first course in Hurwitz theory /
Cavalieri, Renzo,1976-

Riemann surfaces and algebraic curvesa first course in Hurwitz theory /[electronic resource] :Renzo Cavalieri, Eric Miles. - New York :Cambridge University Press,2016. - xii, 183 p. :ill., digital ;24 cm. - London Mathematical Society student texts ;87. - London Mathematical Society student texts ;70..

Hurwitz theory, the study of analytic functions among Riemann surfaces, is a classical field and active research area in algebraic geometry. The subject's interplay between algebra, geometry, topology and analysis is a beautiful example of the interconnectedness of mathematics. This book introduces students to this increasingly important field, covering key topics such as manifolds, monodromy representations and the Hurwitz potential. Designed for undergraduate study, this classroom-tested text includes over 100 exercises to provide motivation for the reader. Also included are short essays by guest writers on how they use Hurwitz theory in their work, which ranges from string theory to non-Archimedean geometry. Whether used in a course or as a self-contained reference for graduate students, this book will provide an exciting glimpse at mathematics beyond the standard university classes.

ISBN: 9781316569252Subjects--Topical Terms:

470913
Riemann surfaces.

LC Class. No.: QA333 / .C38 2016

Dewey Class. No.: 515.93

Riemann surfaces and algebraic curves[electronic resource] :a first course in Hurwitz theory /
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520 $a Hurwitz theory, the study of analytic functions among Riemann surfaces, is a classical field and active research area in algebraic geometry. The subject's interplay between algebra, geometry, topology and analysis is a beautiful example of the interconnectedness of mathematics. This book introduces students to this increasingly important field, covering key topics such as manifolds, monodromy representations and the Hurwitz potential. Designed for undergraduate study, this classroom-tested text includes over 100 exercises to provide motivation for the reader. Also included are short essays by guest writers on how they use Hurwitz theory in their work, which ranges from string theory to non-Archimedean geometry. Whether used in a course or as a self-contained reference for graduate students, this book will provide an exciting glimpse at mathematics beyond the standard university classes.
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650 0 $a Geometry, Algebraic. $3 433494
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856 4 0 $u https://doi.org/10.1017/CBO9781316569252

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