本书特色：抽象与具体结合，理论与应用结合。目前的代数书，常常单线地朝抽象方向发展，使读者--甚至一些数学家们--觉得代数学是抽象概念的游戏。各种数学理论的平行发展，到了代数学中，取得了整合与统一。

Clearly presented elements of one of the most penetrating concepts in modern mathematics include discussions of fields, vector spaces, homogeneous linear equations, extension fields, polynomials, algebraic elements, as well as sections on solvable groups, permutation groups, solution of equations by radicals, and other concepts. 1966 edition.

本书由著名代数学家与代数几何学家Michael Artin所著，是作者在代数领域数十年的智慧和经验的结晶。书中既介绍了矩阵运算、群、向量空间、线性变换、对称等较为基本的内容，又介绍了环、模型、域，伽罗瓦理论等较为高深的内容，本书对于提高数学理解能力。增强对代数的兴趣是非常有益处的。此外，本书的可阅读性强，书中的习题也很有针对性，能让读者很快地掌握分析和思考的方法。 本书在麻省理工学院、普林斯顿大学、哥伦比亚大学等著名学府得到了广泛采用，是代数学的经典教材之一。

《代数学基础(影印版)》论述代数学及其在现代数学和科学中的地位，高度原创且内容充实。作者通过讨论大学代数课程，如李群、上同调、范畴论等，阐述每个代数概念的起源与物理现象及其他数学分支之间的联系。《代数学基础(影印版)》为数学家必读，无论他是初学代数学还是代数学专家。

《代数》(第3版)：As I see it, the graduate course in algebra must primarily prepare studentsto handle the algebra which they will meet in all of mathematics: topology,partial differential equations, differential geometry, algebraic geometry, analysis,and representation theory, not to speak of algebra itself and algebraic numbertheory with all its ramifications. Hence I have inserted throughout references topapers and books which have appeared during the last decades, to indicate someof the directions in which the algebraic foundations provided by this book areused; I have accompanied these references with some motivating comments, toexplain how the topics of the present book fit into the mathematics that is tocome subsequently in various fields; and I have also mentioned some unsolvedproblems of mathematics in algebra and number theory. The abc conjecture isperhaps the most spectacular of these.

This book grew out of a course of lectures given to third year undergraduates at Oxford University and it has the modest aim of producing a rapid introduction to the subject. It is designed to be read by students who have had a first elementary course in general algebra. On the other hand, it is not intended as a substitute for the more voluminous tracts such as Zariski-Samuel or Bourbaki. We have concentrated on certain central topics, and large areas, such as field theory, are not touched. In content we cover rather more ground than Northcott and our treatment is substantially different in that, following the modern trend, we put more emphasis on modules and localization.

本书由著名代数学家与代数几何学家Michael Artin所著，是作者在代数领域数十年的智慧和经验的结晶。书中既介绍了矩阵运算、群、向量空间、线性算子、对称等较为基本的内容，又介绍了环、模型、域、伽罗瓦理论等较为高深的内容。本书对于提高数学理解能力，增强对代数的兴趣是非常有益处的。此外，本书的可阅读性强，书中的习题也很有针对性，能让读者很快地掌握分析和思考的方法。 作者结合这20年来的教学经历及读者的反馈，对本版进行了全面更新，更强调对称性、线性群、二次数域和格等具体主题。本版的具体更新情况如下：  新增球面、乘积环和因式分解的计算方法等内容，并补充给出一些结论的证明，如交错群是简单的、柯西定理、分裂定理等。  修订了对对应定理、SU2 表示、正交关系等内容的讨论，并把线性变换和因子分解都拆分为两章来介绍。  新增大量习题，并用星号标注出具有挑战性的习题。 本书在麻省理工学院、普林斯顿大学、哥伦比亚大学等著名学府得到了广泛采用，是代数学的经典教材之一。

This text for a second course in linear algebra, aimed at math majors and graduates, adopts a novel approach by banishing determinants to the end of the book and focusing on understanding the structure of linear operators on vector spaces. The author has taken unusual care to motivate concepts and to simplify proofs. For example, the book presents - without having defined determinants - a clean proof that every linear operator on a finite-dimensional complex vector space has an eigenvalue. The book starts by discussing vector spaces, linear independence, span, basics, and dimension. Students are introduced to inner-product spaces in the first half of the book and shortly thereafter to the finite- dimensional spectral theorem. A variety of interesting exercises in each chapter helps students understand and manipulate the objects of linear algebra. This second edition features new chapters on diagonal matrices, on linear functionals and adjoints, and on the spectral theorem; some sections, such as those on self-adjoint and normal operators, have been entirely rewritten; and hundreds of minor improvements have been made throughout the text.

据原书第7版译出。本书结合大量应用和实例详细介绍线性代数的基本概念、基本定理与知识点，主要内容包括：矩阵与方程组、行列式、向量空间、线性变换、正交性、特征值和数值线性代数等。为巩固所学的基本概念和基本定理，书中每一节后都配有练习题，并在每一章后提供了MATLAB练习题和测试题。.本书叙述简洁，通俗易懂，理论与应用相结合，适合作为高等院校本科生“线性代数”课程的教材，同时也可作为工程技术人员的参考书。..随着计算机技术的发展，线性代数课程的重要性越来越突出。同时，现代软件技术已经为显著改进授课方式提供了可能。本书作者多年讲授线性代数课程，并在教学过程中不断探索更利于学生理解的新教学方法，从而使本书更加适合作为线性代数课程的教材。

描述线性算子的结构是线性代数的中心任务之一，传统的方法多以行列式为工具，但是行列式既难懂又不直观，其定义的引入也往往缺乏动因。本书作者独辟蹊径，抛弃了这种曲折的思路，把重点放在抽象的向量空间和线性映射上，给出的证明不使用行列式，更显得简单而直观。本书把行列式的内容放在了最后讲解，开辟了一条理解线性算子结构的新途径。书中还对一些术语、结论、证明思路、提及的数学家做了注释，增加了行文的趣味性，便于读者掌握核心概念和思想方法。 本书起点较低，不需要太多预备知识，而特色鲜明，是公认的阐述线性代数的经典佳作。原书自出版以来，迅速风靡世界，在30多个国家为200多所高校所采用，其中包括斯坦福大学和加州大学伯克利分校等著名学府。