The Concept of a Riemann Surface Dover Books on Mathematics 3rd ed. Edition

Weyl's two-part treatment defines the concept and topology of Riemann surfaces and explores functions on Riemann surfaces, illustrating their role in visualizing analytic functions.

商品＃: 43100517

The Concept of a Riemann Surface Dover Books on Mathematics 3rd ed. Edition

商品＃: 43100517

JPY 3158

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Weyl's two-part treatment defines the concept and topology of Riemann surfaces and explores functions on Riemann surfaces, illustrating their role in visualizing analytic functions.

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Comprehensive Coverage

Offers an in-depth exploration of Riemann surfaces, providing a thorough understanding suitable for both learners and advanced mathematicians, making complex concepts more accessible.

Dover Quality

Published by Dover Publications, renowned for high-quality mathematical texts, ensuring durable construction and clear presentation suited for rigorous academic study.

Updated Edition

The third edition includes revised content and contemporary examples, enhancing learning and keeping pace with the latest developments in mathematics for enhanced relevance.

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1.6 lbs (730 grams)

どんな人にお勧めですか？

Mathematics Students
Ideal for undergraduate and graduate mathematics students studying complex analysis and topology concepts related to Riemann surfaces.
Researchers
Beneficial for researchers in mathematics who require a deep understanding of Riemann surfaces in their work.
Instructors
Useful for educators teaching higher level mathematics courses, providing a comprehensive resource for course material on Riemann surfaces.

Beginner Readers
Not suitable for those new to mathematics as it requires prior knowledge of complex analysis and topology.
Casual Learners
Not recommended for casual learners looking for an introductory or light exploration of mathematical concepts.
Non-Mathematicians
May not appeal to individuals outside of mathematics or related fields due to its technical rigor and depth.

製品説明書

The Concept of a Riemann Surface Dover Books on Mathematics 3rd ed. Edition

何か質問はありますか？おしゃべりしましょう

顧客の質問と回答

質問: What is a Riemann surface?

答え: A Riemann surface is a one-dimensional complex manifold, which allows the study of complex functions in a multi-valued manner. This concept is significant in complex analysis and algebraic geometry, enabling us to treat functions that have multiple values under certain conditions. For instance, the square root function defined in the complex plane becomes single-valued when viewed on a Riemann surface, allowing for a better understanding of its behavior in calculus.
質問: Who is the author of The Concept of a Riemann Surface?

答え: The book is authored by Harold P. F. Swinnerton-Dyer, who is renowned for his contributions to mathematics, particularly in the fields of number theory and analysis. His expertise in these areas lends credibility to the discussions within the book, making it a valuable resource for students and researchers interested in understanding complex structures in mathematics.
質問: What topics are covered in The Concept of a Riemann Surface?

答え: The book comprehensively covers the foundational aspects of Riemann surfaces, including their definitions, properties, and applications in various fields of mathematics. It delves into topics such as analytic functions, covering spaces, and the connection to algebraic curves. Such a wide range of topics makes the book suitable for both beginners and advanced students exploring complex analysis.
質問: Is The Concept of a Riemann Surface suitable for beginners?

答え: Yes, The Concept of a Riemann Surface is designed to cater to readers at different levels, including those new to the subject. While it delves into advanced topics, Swinnerton-Dyer provides clear explanations and illustrative examples that help demystify complex concepts. This makes it a valuable resource for math enthusiasts eager to grasp the basics of Riemann surfaces in a structured manner.
質問: How does The Concept of a Riemann Surface relate to complex analysis?

答え: The Concept of a Riemann Surface serves as a fundamental text connecting Riemann surfaces to complex analysis. By viewing functions on Riemann surfaces, complex analysis can be elevated from real-number functions to multi-dimensional scenarios. This relationship is critical for understanding the behavior of complex functions and studying phenomena like branch cuts and singularities.
質問: What are some applications of Riemann surfaces?

答え: Riemann surfaces have various applications in both theoretical physics and mathematical fields, such as string theory, algebraic geometry, and number theory. They provide insights into the behavior of complex functions and play a crucial role in defining spaces that mathematicians use to explore advanced concepts, such as moduli spaces, which classify Riemann surfaces based on their properties.
質問: Can I find exercises or examples in The Concept of a Riemann Surface?

答え: Indeed, The Concept of a Riemann Surface includes various exercises and illustrative examples throughout the text. These practical components help reinforce understanding and allow readers to apply theoretical concepts in real-world mathematical scenarios. Engaging with these exercises can significantly enhance comprehension and facilitate deeper exploration of Riemann surfaces.
質問: Does this book incorporate modern techniques in mathematics?

答え: Yes, The Concept of a Riemann Surface incorporates modern techniques and perspectives in mathematics, reflecting the ongoing evolution of the field. By integrating contemporary insights, Swinnerton-Dyer makes the material relevant to current mathematical discourse, ensuring that readers grasp how Riemann surfaces are utilized in current research and applications.
質問: What is the importance of Riemann surfaces in algebraic geometry?

答え: Riemann surfaces play a pivotal role in algebraic geometry as they bridge the understanding of algebraic curves with complex analysis. They allow mathematicians to study properties of these curves in a nuanced manner, facilitating the analysis of solutions to polynomial equations and providing tools to visualize complex relationships. This intersection is instrumental in advancing theories in algebraic geometry.
質問: Where can I buy The Concept of a Riemann Surface in Japan?

答え: You can purchase The Concept of a Riemann Surface (Dover Books on Mathematics) on Ubuy. Ubuy offers a straightforward experience for obtaining this book and ensures that you have access to a reliable source of mathematical literature right from your location.

Functional Analysis Editorial Review

The Concept of a Riemann Surface is a book best suited for readers with a strong mathematical background. The notation used in the book is somewhat old, making it difficult for beginners to grasp the subject matter. For those with the necessary mathematical knowledge, the book may be excellent. However, for those looking for a more approachable introduction, it may not be the best option. Overall, the book is a valuable resource for those with a solid understanding of advanced mathematics.

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長所

Suitable for readers with a strong mathematical background
May be an excellent resource for those with the necessary knowledge

短所

Not a good introduction for beginners

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JPY 3158

今すぐ注文すると頃に届きます水曜日, 6月 24

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特徴と利点

Written by one of the most renowned mathematicians of the twentieth century
Combines function theory and geometry
Forms the basis of modern analysis, geometry, and topology
Develops Riemann's theory of algebraic functions and their integrals with rigor
Illustrates the significance of Riemann surfaces in understanding analytic functions
High-level landmark work in mathematics

The Concept of a Riemann Surface Dover Books on Mathematics 3rd ed. Edition

JPY 3158

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製品詳細

どんな人にお勧めですか？

製品説明書

顧客の質問と回答

Functional Analysis Editorial Review

お客様のレビュー＆評価

この商品のレビュー

長所

短所

Product Price History

重要な情報

JPY 3158

特徴と利点

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