本书内容包括数、数的加法和数的乘法，以及由此延伸开来的群、环、域、多项式和向量空间。与其他线性代数的教科书不同的是立足点和理论框架的选择。本书不将任何数及其算术运算当成给定的原始概念，而是从数学基础的角度建立起它们的确切解释，并将这样的解释作为数学的一种基础，进而建立和发展线性空间的基本理论。

《群表示论》是作者在北京国际数学研究中心给数学基础强化班授课讲稿的基础上，结合在北京大学数学科学学院多次讲授群表示论课的心得体会编写而成，主要内容包括：有限群在特征不能整除群的阶的域上的线性表示、无限群在复（实）数域上的有限维和无限维线性表示等。《群表示论》紧紧抓住群表示论的主线——研究群的不可约表示,首先提出要研究的问题, 探索如何解决问题, 把深奥的群表示论知识讲得自然、清晰、易懂。在阐述无限群的线性表示理论时，本书介绍了数学上处理无限问题的典型方法，并且对于需要的拓扑学、实（复）分析以及泛函分析的知识作了详尽介绍。本书在绝大多数章节中都配有习题, 并且在书末附有习题解答。
《群表示论》可作为高等院校数学系和物理系的研究生以及高年级本科生的群表示论课的教学用书，也可供数学系和物理系教师、科研工作者以及学过高等代数和抽象代数的读者使用参考。

《国外数学名著系列(影印版)25:代数复杂性理论》全面系统地讲述了代数复杂性理论的知识，书中包含了近400个习题和超过500个参考文献，对初学者和科研人员都有很高的参考价值。

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This book is an indispensable source for anyone with an interest in semigroup theory or whose research overlaps with this increasingly important area of mathematics. It is a clear and readable introduction to the subject, with emphasis on various classes of regular and semigroups. More than 150 exercises, accompanied by relevant references to the literature,give pointerse to areas of the subject not explicitly covered in the text.

《群论导论(第4版)(英文版)》介绍了：Group Theory is a vast subject and, in this Introduction （as well as in theearlier editions）, I have tried to select important and representative theoremsand to organize them in a coherent way. Proofs must be clear, and examplesshould illustrate theorems and also explain the presence of restrictive hypo-theses. ！ also believe that some history should be given so that one canunderstand the origin of problems and the context in which the subjectdeveloped. Just as each of the earlier editions differs from the previous one in a signifi-cant way, the present （fourth） edition is genuinely different from the third.Indeed, this is already apparent in the Table of Contents. The book nowbegins with the unique factorization of permutations into disjoint cycles andthe parity of permutations; only then is the idea of group introduced. This isconsistent with the history of Group Theory, for these first results on permu-tations can be found in an 1815 paper by Cauchy, whereas groups of permu-tations were not introduced until 1831 （by Galois）But even if history

本书概要介绍半个世纪以来由数字通信的可靠性要求所建立和不断发展的纠错码数学理论。书中不涉及纠错技术和工程具体实现问题，但也介绍了一些纠错译码算法。
本书适用于代数专业的研究生和具有较好代数基础的高年级本科生。书中所讲述的知识和方法对于研究信息科学与计算机科学中许多其他问题也会有所帮助。

该书是算子代数一套三册中的第一分册，重点介绍了理论分析和拓扑方面的知识，同时使得读者容易掌握局部紧空间上算子代数和测度论之间的联系。

These notes are based on the course of lectures I gave at Harvard in the fall of 1964. They constitute a self-contained account of vector bundles and K-theory assuming only the rudiments of point-set topology and linear algebra. One of the features of the treatment is that no use is made of ordinary homology or cohomology theory. In fact, rational cohomology is defined in terms of K-theory.

《交换代数(英文影印版)》主要内容：It has seemed to me for a long time that commutative algebra is best practiced with knowledge of the geometric ideas that played a great role in its formation: in short, with a view toward algebraic geometry.Most texts on commutative algebra adhere to the tradition that says a subject should be purified until it references nothing outside itself. There are good reasons for cultivating this style; it leads to generality, elegance, and brevity, three cardinal virtues. But it seems' to me unnecessary and undesirable to banish, on these grounds, the motivating and fructifying ideas on which the discipline is based.

本书以初等函数为重点，介绍了微积分相关的内容，包括微分、积分、无穷级数、傅里叶展开和勒贝格积分等9章内容. 作者采用讲义式的叙述方式，把数学看成有生命的东西，让读者有一种别样的新鲜感.
本书是一本经典的微积分教材，原版被日本各大学普遍采用，适合数学专业及其他各理工科专业高年级本科生和低年级研究生用作教材或参考书.

This landmark among mathematics texts applies group theory to quantum mechanics, first covering unitary geometry, quantum theory, groups and their representations, then applications themselves—rotation, Lorentz, permutation groups, symmetric permutation groups, and the algebra of symmetric transformations. Unabridged republication of the English (1931) edition.

本书是根据美国科学院院士，著名数学家P·格列菲斯在北京大学讲课的讲稿整理写成的。本书篇幅虽不大，但内容丰富，阐述精炼，引人入胜。书中深入浅出地介绍了正则化定理，Riemann-Roch定理，Abel定理等代数曲线论的重要结果，以及这些定理的应用和重要的几何事实。读者只要具有大学复变函数论和抽象代数的基础知识即可阅读此书。 本书可作为大学数学系高年级学生和研究生教材，也可供数学工作者参考。

这是一本专门讲述伽罗瓦理论的教材。内容包括伽罗瓦理论基本定理和多项式方程的根式可解性、伽罗瓦群的计算及其反问题，《伽罗瓦理论：天才的激情》强调通过伽罗瓦对应，可将代数数域中的问题转化成群论的问题加以解决。作为这种思想的应用，证明了代数基本定理，解决了e和的超越性及尺规作图的四大古代难题。为方便读者查阅，附录中详细梳理了所要用到的群、环、域方面的结论。每节配有充足的习题并包含提示。
《伽罗瓦理论：天才的激情》可作为高等学校数学类各专业的教材，也可供其他相关专业参考。

《伽罗瓦理论》内容简介：This exposition of Galois theory was originally going to be Chapter 1 of thecontinuation of my book Fermat's Last Theorem, but it soon outgrew anyreasonable bounds for an introductory chapter, and I decided to make it aseparate book. However, this decision was prompted by more than just thelength. Following the precepts of my sermon "Read the Masters！" [E2], Imade the reading of Galois' original memoir a major part of my study ofGalois theory, and I saw that the modern treatments of Galois theory lackedmuch of the simplicity and clarity of the original. Therefore I wanted towrite about the theory in a way that would not only explain it, but explain itin terms close enough to Galois' own to make his memoir accessible to thereader, in the same way that I tried to make Riemann's memoir on the zetafunction and Kummer's papers on Fermat's Last Theorem accessible in myearlier books, [El] and [E3]. Clearly I could not do this within the confinesof one expository chapter.

《代数特征值问题》是一本计算数学名著。作者用摄动理论和向后误差分析方法系统地论述代数特征值问题以及有关的线性代数方程组、多项式零点的各种解法，并对方法的性质作了透彻的分析。《代数特征值问题》的内容为研究代数特征值及有关问题提供了严密的理论基础和强有力的工具。《代数特征值问题》共分九章。第一章叙述矩阵理论，第二、三章介绍摄动理论和向后舍入误差分析方法，第四章分析线性代数方程组解法，第五章讨论Hermite矩阵的特征值问题，第六、七章研究如何把一般矩阵化为压缩型矩阵及压缩型矩阵的特征值的问题，第八章论述LR和QR算法，最后一章讨论各种迭代法。