Moduli of Riemann surfaces, real algebraic curves, and their superanalogs
Author(s)
Bibliographic Information
Moduli of Riemann surfaces, real algebraic curves, and their superanalogs
(Translations of mathematical monographs, v. 225)
American Mathematical Society, c2004
- Other Title
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Модули римановых поверхностей и вещественных алгебраических кривых и их супераналоги
Moduli rimanovykh poverkhnosteĭ i veshchestvennykh algebraicheskikh krivykh i ikh superanalogi
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
NAT||12||1(L)04027258
Note
Original Russian ed. published: Москва : МЦНМО, 2003
Includes bibliographical references (p. 153-157) and index
Description and Table of Contents
Description
The space of all Riemann surfaces (the so-called moduli space) plays an important role in algebraic geometry and its applications to quantum field theory. The present book is devoted to the study of topological properties of this space and of similar moduli spaces, such as the space of real algebraic curves, the space of mappings, and also superanalogs of all these spaces. The book can be used by researchers and graduate students working in algebraic geometry, topology, and mathematical physics.
Table of Contents
Introduction Moduli of Riemann surfaces, Hurwitz type spaces and their superanalogs Moduli of real algebraic curves and their superanalogs. Differentials, spinors, and Jacobians of real curves Spaces of meromorphic functions on complex and real algebraic curves Bibliography Index.
by "Nielsen BookData"