《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.

《代数基本定理》对数学中最重要的定理——代数基本定理给出了六种证明，方法涉及到分析、代数与拓扑等数学分支。《代数基本定理》的六个证明：两个分析方法中一个（本质上）是运用实分析中的两维极值定理，一个是运用标准的复分析方法，也就是经典的Liouville定理；两个代数方法中一个是运用多项式环的知识，一个是运用域扩张的Galois定理：两个拓扑方法中一个是运用分枝数的计算，另一个是运用单位球的基本群。此外附录中给出了Gauss的证明，cauchy的证明，三个另外的反分析证明以及两个另外的拓扑证明。
《代数基本定理》以一个问题为主线，纵横数学的几乎所有领域，结构严谨、文笔流畅、浅显易懂、引人入胜，是一本少见的能让读者入迷的好读物，可以使读者与作者在书中很好地进行对话与交流。通过学习《代数基本定理》，读者可以增加知识面，加深对学科交叉与渗透的理解和认识。不足之处是各种方法之间缺乏进行比较的描写和分析。
《代数基本定理》适合高年级大学生、研究生自学和讨论，特别适合于用作短学期教材或数学选修类课程教材。

《有限群的线性表示》是著名法国数学家、菲尔兹奖获得者JeanPierreserre的经典著作。全书分三部分。第一部分讲述有限群的线性表示的最基本的内容，主要是群表示和特征标的对应关系；第二部分对群的常表示做了进一步的阐述，如诱导表示、有理性问题等；第三部分简单讨论了群的模表示理论。《有限群的线性表示》深入浅出，对内容的处理极有特色，是学习有限群的线性表示的经典书籍。
《有限群的线性表示》根据原书第二版的英译本翻译，并根据法文修订第三版作了校订。

This book consists of three parts, rather different in level and purpose. The first part was originally written for quantum chemists. It describes the correspondence, due to Frobenius, between linear representations and characters. The second part is a course given in 1966 to second-year students of l'Ecole Normale. It completes in a certain sense the first part. The third part is an introduction to Brauer Theory.

《代数数论》系统、全面地介绍了该领域的经典理论，并对今后的研究方向作了介绍，书中包含了大量的例子，帮助读者理解。这次科学出版社购买了版权,一次影印了23本施普林格出版社出版的数学书,就是一件好事,也是值得继续做下去的事情。大体上分一下,这28本书中,包括基础数学书5本,应用数学书6本与计算数学书12本,其中有些书也具有交叉性质。这些书都是很新的,2000年以后出版的占绝大部分,共计16本,其余的也是1990年以后出版的。这些书可以使读者较快地了解数学某方面的前沿,例如基础数学中的数论、代数与拓扑三本,都是由该领域大数学家编著的“数学百科全书”的分册。对从事这方面研究的数学家了解该领域的前沿与全貌很有帮助。按照学科的特点,基础数学类的书以“经典”为主,应用和计算数学类的书“前沿”为主。这些书的作者多数是国际知名的大数学家,例如《拓扑学》一书的作者诺维科夫是俄罗斯科学院的院士,曾获“菲尔兹奖”和“沃尔夫数学奖”。这些大数学家的著作无疑将会对我国的科研人员起到非常好的指导作用。
当然,23本书只能涵盖数学的一部分,所以,这项工作还应该继续做下去。更进一步,有些读者面较广的好书还应该翻译成中文出版,使之有更大的读者群。

《环与代数》主要介绍国内外环与代数的最新研究成果和发展方向，在第一版的基础上，除删除了一些陈旧内容外，还增添关于分次环、路代数、箭图表示、有限表示型箭图4章，力图向读者介绍分次环、箭图及其表示最基本的知识，使之能够了解和进入环与代数当前研究的一些非常具有活力的领域。我们将介绍分次环、分次模、分次Artin环、Smash积、分次本原环、箭图的路代数、路代数的性质、路代数的张量积和箭图的直积；箭图表示的基本内容、箭图表示的Auslander-Reiten理论；Dynkin图及其表示，Betaastein-Gelfand-Ponomarev反射函子，有限表示型的箭图的刻画（Gabriel定理）等内容。
《环与代数》适合数学及相关专业高年级大学生、研究生、教师及科研人员阅读参考。

本书主要内容包括线性方程组、矩阵代数、行列式、向量空间、特征值与特征向量、正交性和最小二乘法、对称矩阵和二次型等。此外，本书包含大量的练习题、习题、例题等，便于读者参考。

代数几何，ISBN：9787030029706，作者：（美）R.哈茨霍恩（Robin Hartshorne）著；冯克勤等译

《布尔代数及其泛化结构》是作者多年教学与科研工作的结晶．书中既有对经典与发展中的布尔代数理论和应用的系统和完备的概括，又有对其泛化结构和应用的最新研究成果的深层次揭示；从而使布尔代数能够更加深入地反映客观世界与主观世界原型系统中的规律与复杂性。
《布尔代数及其泛化结构》第一次从数理逻辑与抽象代数相结合的“综合基”上构筑布尔代数的新框架与新体系，其内容适应了当今复杂对象推理、不确定性推理与大系统逻辑分析发展的需要；提供了有关超大规模集成电路、光路等逻辑设计与控制工程中相应的数学模型；同时诱导出许多解决实际问题的思路与方法。

《范畴论》作者在书中使用的是现代范畴论通用的概念和术语，但是在对一些基本概念和理论的处理过程中，作者尝试使用比较简洁直接的方法，避免烦琐的论述。《范畴论》的前3章是范畴论的基础内容，适合高年级本科生和研究生的教学以及科研人员对范畴论基础知识的需要，第4章可供从事代数拓扑学尤其是同调代数研究的研究生和科研人员学习和参考，第5章既可以为从事代数几何的科研人员参考，同时也可为希望进一步学习Topos理论的读者提供层论方面的预备知识。

This extraordinary volume contains a large part of the mathematical correspondence between A. Grothendieck and J.-P. Serre. It forms a vivid introduction to the study of algebraic geometry during the years 1955-1965. During this period, algebraic geometry went through a remarkable transformation, and Grothendieck and Serre were among central figures in this process. In the book, the reader can follow the creation of some of the most important notions of modern mathematics, such assheaf cohomology, schemes, Riemann-Roch type theorems, algebraic fundamental group, motives, etc. The letters also reflect the mathematical and political atmosphere of this period (Bourbaki, Paris, Harvard, Princeton, war in Algeria, etc.). Also included are letters written between 1984 and 1987. Theletters are supplemented by J-P.Serre's notes, which give explanations, corrections, and references to further results. The book is a unique bilingual (French and English) volume. The original French text is supplemented here by the English translation, with French text printed on the left-hand pages and the corresponding English text printed on the right. The book also includes several facsimiles of original letters. The original French volume was edited by Pierre Colmez and J-P. Serre. TheEnglish translation for this volume was translated by Catriona Maclean and edited by J-P. Serre and Leila Schneps. The book should be useful to specialists in algebraic geometry, mathematical historians, and to all mathematicians who want to experience the unfolding of great mathematics.

This volume contains a collection of clever mathematical applications of linear algebra, mainly in combinatorics, geometry, and algorithms. Each chapter covers a single main result with motivation and full proof in at most ten pages and can be read independently of all other chapters (with minor exceptions), assuming only a modest background in linear algebra. The topics include a number of well-known mathematical gems, such as Hamming codes, the matrix-tree theorem, the Lovasz bound on the Shannon capacity, and a counterexample to Borsuk's conjecture, as well as other, perhaps less popular but similarly beautiful results, e.g., fast associativity testing, a lemma of Steinitz on ordering vectors, a monotonicity result for integer partitions, or a bound for set pairs via exterior products. The simpler results in the first part of the book provide ample material to liven up an undergraduate course of linear algebra. The more advanced parts can be used for a graduate course of linear-algebraic methods or for seminar presentations. Table of Contents: Fibonacci numbers, quickly; Fibonacci numbers, the formula; The clubs of Oddtown; Same-size intersections; Error-correcting codes; Odd distances; Are these distances Euclidean?; Packing complete bipartite graphs; Equiangular lines; Where is the triangle?; Checking matrix multiplication; Tiling a rectangle by squares; Three Petersens are not enough; Petersen, Hoffman-Singleton, and maybe 57; Only two distances; Covering a cube minus one vertex; Medium-size intersection is hard to avoid; On the difficulty of reducing the diameter; The end of the small coins; Walking in the yard; Counting spanning trees; In how many ways can a man tile a board?; More bricks--more walls?; Perfect matchings and determinants; Turning a ladder over a finite field; Counting compositions; Is it associative?; The secret agent and umbrella; Shannon capacity of the union: a tale of two fields; Equilateral sets; Cutting cheaply using eigenvectors; Rotating the cube; Set pairs and exterior products; Index. (STML/53)

《近世代数》是作者自1980年以来至今讲授抽象代数（近世代数）课程的教学经验和心得的结晶，有一些独到的科学见解；由于按照数学的思维方式讲课，因此把深奥难懂的抽象代数讲得通俗易懂。内容包括：引言（近世代数的创立和基本方法，以及应用示例），群论（主线为群同态，讲了群在集合上的作用，Sylow定理，有限abel群的同构分类等），环论（主线为理想，讲了素理想，极大理想，欧几里得整环，主理想整环，因子分解整环等），域论（主线为域扩张，讲了域扩张的途径，域扩张的性质，域扩张的自同构群，伽罗瓦扩张，伽罗瓦理论的基本定理等）和模论的基本知识。书末附有习题答案和提示。
《近世代数》适合用作綜合大学，高等师范院校和理工科大学数学系本科"近世代数（抽象代数

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.

本书出自近世代数领域的两位巨匠之手, 是一本经典的教材。全书共分为15章, 内容包括：整数、有理数和域、多项式、实数、复数、群、向量与向量空间、矩阵代数、线性群、行列式与标准型、布尔代数与格、超限算术、环与理想、代数数域和伽罗瓦理论等。
本书适合数学专业及其他理工科专业高年级本科生和研究生使用, 是一本非常有价值的教材和参考书。

高等近世代数，ISBN：9787111191605，作者：（美）罗特曼

本书是《princeton landmarks in mathematics》系列之一，是一部经典的教材。书中讨论了对称，全线性，正交和辛群，以及它们的不同的不变性和表示论，运用代数的基本观点阐释群的不同性质，恰到好处地运用分析和拓扑。书中也包括了矩阵代数，半群和交换子和自旋子，这些对于很好地理解量子力学的群理论结构很有帮助。目次：引入；向量不变量；矩阵代数和群环；对称群和完全线性群；正交群；对称群；特征；不变基本理论；矩阵代数综述；补充。
读者对象：数学专业的本科生，研究生和相关的科研人员。

《数学工作者必知的范畴学(第2版)》内容简介：This second edition of "Categories Work" adds two new chapters on topics of active interest. One is on symmetric monoidal categories and braided monoidal categories and the coherence theorems for them——items of interest in their own right and also in view of their use in string theory in quantum field theory. The second new chapter describes 2-categories and the higher-dimensional categories that have recently come into prominence. In addition, the bibliography has been expanded to cover some of the many other recent advances concerning categories.

《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。

近世代数是代数学一个基础学科，讲述代数基本结构的特性，本书除系统介绍群、环和域的基础知识（包括域的有限伽罗瓦扩张理论）之外，还力图强调近世代数中的思想和方法，书中有大量习题，除主线内容之外，还增加一些附录用来开拓和深化所学内容。
本书在中国科学技术大学讲授多年的讲义基础上修改写成，可作为高等学校数学系基础课教材，也可供数学工作者和通信、计算机科学等领域的工程技术人员参考。