Commutative Algebra Through Exercises

Bandini, Andrea, Gianni, Patrizia, Sbarra, Enrico

  • 出版商: Springer
  • 出版日期: 2024-07-13
  • 售價: $2,780
  • 貴賓價: 9.5$2,641
  • 語言: 英文
  • 頁數: 392
  • 裝訂: Quality Paper - also called trade paper
  • ISBN: 3031569091
  • ISBN-13: 9783031569098
  • 海外代購書籍(需單獨結帳)

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商品描述

This book provides a first introduction to the fundamental concepts of commutative algebra. What sets it apart from other textbooks is the extensive collection of 400 solved exercises, providing readers with the opportunity to apply theoretical knowledge to practical problem solving, fostering a deeper and more thorough understanding of the subject.

The topics presented here are not commonly found in a single text. Consequently, the first part presents definitions, properties, and results crucial for understanding and solving the exercises, serving also as a valuable reference. The second part contains the exercises and a section titled with "True or False?" questions, which serves as a valid self-assessment test. Considerable effort has been invested in crafting solutions that provide the essential details, aiming for a well-balanced presentation. We intend to guide students systematically through the challenging process of writing mathematical proofs with formal correctness and clarity.

Our approach is constructive, aiming to illustrate concepts by applying them to the analysis of multivariate polynomial rings and modules over a principal ideal domain (PID) whenever feasible. Algorithms for computing these objects facilitate the generation of diverse examples. In particular, the structure of finitely generated modules over a PID is analyzed using the Smith canonical form of matrices. Furthermore, various properties of polynomial rings are investigated through the application of Buchberger's Algorithm for computing Gröbner bases.

This book is intended for advanced undergraduates or master's students, assuming only basic knowledge of finite fields, Abelian groups, and linear algebra. This approach aims to inspire the curiosity of readers and encourages them to find their own proofs while providing detailed solutions to support their learning. It also provides students with the necessary tools to pursue more advanced studies in commutative algebra and related subjects.

商品描述(中文翻譯)

這本書提供了對交換代數基本概念的初步介紹。與其他教科書不同的是,它包含了400個解答過的練習題,讓讀者有機會將理論知識應用於實際問題解決,從而深入且全面地理解這個主題。

這裡介紹的主題在單一教材中並不常見。因此,第一部分介紹了定義、性質和結果,這些對於理解和解決練習題至關重要,同時也是一個有價值的參考資料。第二部分包含了練習題和一個名為「真或假?」的問題部分,可以作為有效的自我評估測試。我們在解答中花了很大的功夫,提供了必要的細節,力求達到平衡的呈現。我們的目標是系統地引導學生進行數學證明的寫作過程,確保正確性和清晰性。

我們的方法是建設性的,旨在通過將概念應用於多變量多項式環和主理想整域(PID)上的模的分析來進行說明,以便在可行的情況下生成各種例子。計算這些對象的算法有助於生成多樣化的例子。特別是,使用矩陣的史密斯標準形分析了PID上有限生成模的結構。此外,通過應用布赫伯格算法計算格羅布納基底,研究了多項式環的各種性質。

這本書適用於高年級本科生或碩士生,只需具備有限域、阿貝爾群和線性代數的基本知識。這種方法旨在激發讀者的好奇心,鼓勵他們尋找自己的證明,同時提供詳細的解答以支持他們的學習。它還為學生提供了追求更高級的交換代數和相關學科研究所需的工具。

作者簡介

Andrea Bandini is an associate professor of algebra at the Department of Mathematics of the University of Pisa. He has taught several courses in basic algebra, commutative algebra, and number theory. His research interests mainly concern algebraic number theory and arithmetic geometry.

Patrizia Gianni is a professor of algebra specializing in computer algebra and is recognized for her contributions to Gröbner bases and computational real algebraic geometry. She played a key role in the development of the Axiom computer algebra system.

Enrico Sbarra received his doctorate in Germany at the University Duisburg-Essen under the supervision of Jürgen Herzog. After collaborating with the Universities of Trieste, Bochum and Genoa, since 2008, he has been a researcher in algebra and a lecturer at the Department of Mathematics in Pisa. He is the author of several papers published in prominent international journals. His research interests include combinatorial and commutative algebra, with applications to algebraic geometry.

作者簡介(中文翻譯)

Andrea Bandini是比薩大學數學系的代數學副教授。他教授過多門基礎代數、交換代數和數論的課程。他的研究主要涉及代數數論和算術幾何。

Patrizia Gianni是一位代數學教授,專攻於計算代數和被譽為Gröbner基礎和計算實數代數幾何的貢獻。她在Axiom計算代數系統的發展中扮演了關鍵角色。

Enrico Sbarra在德國杜伊斯堡-埃森大學在Jürgen Herzog的指導下獲得博士學位。在與的里雅斯特、波鴻和熱諾瓦大學合作後,自2008年以來,他一直是比薩大學數學系的研究員和講師。他是多篇發表在知名國際期刊上的論文的作者。他的研究興趣包括組合代數和交換代數,並應用於代數幾何。