An undergraduate introduction to the fundamentals of topology -- engagingly written, filled with helpful insights, complete with many stimulating and imaginative exercises to help students develop a solid grasp of the subject.

拓扑学的方法与结果在各个数学分支中有着广泛的应用，因此适当选择其中的内容供各个分支的研究者与教师之用是一个很重要的工作。本书作者以微分流形为中心写了这本书，涉及拓扑学的广泛的领域并在分析数学、几何学乃至理论物理学中均可得到重要的应用。本书的主要内容是：微分流形、示性类理论、表示论大意、Hodge理论、Hirzebruch指标定理、Riemann-Roch定理、Atiyah-Singer指标定理和Gauss-Bonnet定理等。

《法兰西数学精品译丛•拓扑学教程:拓扑空间和距离空间、数值函数、拓扑向量空间(第2版)》中的基本概念几乎都在其一般形式下来介绍，并通过例子来说明所选择定义的合理性。例如，在叙述任意拓扑空间时，先简要讨论实数直线；而距离空间则在提出一致性问题后才引入；同样，赋范向量空间和Hilbert空间仅在讨论局部凸空间后引入，后者在现代分析及其应用中越来越重要。书中通过大量的例子及反例来说明定理成立的确切范围，并设置了各种难度的习题，便于学生检验其对课程的理解程度并锻炼自身的创新能力。

Differential geometry and topology have become essential tools for many theoretical physicists. In particular, they are indispensable in theoretical studies of condensed matter physics, gravity, and particle physics."Geometry, Topology and Physics, Second Edition" introduces the ideas and techniques of differential geometry and topology at a level suitable for postgraduate students and researchers in these fields. The second edition of this popular and established text incorporates a number of changes designed to meet the needs of the reader and reflect the development of the subject. The book features a considerably expanded first chapter, reviewing aspects of path integral quantization and gauge theories. Chapter 2 introduces the mathematical concepts of maps, vector spaces, and topology. The following chapters focus on more elaborate concepts in geometry and topology and discuss the application of these concepts to liquid crystals, superfluid helium, general relativity, and bosonic string theory. Later chapters unify geometry and topology, exploring fiber bundles, characteristic classes, and index theorems.New to this second edition is the proof of the index theorem in terms of supersymmetric quantum mechanics. The final two chapters are devoted to the most fascinating applications of geometry and topology in contemporary physics, namely the study of anomalies in gauge field theories and the analysis of Polakov's bosonic string theory from the geometrical point of view. "Geometry, Topology and Physics, Second Edition" is an ideal introduction to differential geometry and topology for postgraduate students and researchers in theoretical and mathematical physics.

《拓扑空间论》是点集拓扑学方面的一本经典著作，《拓扑空间论》共十章，内容为：拓扑空间、积空间、仿紧空间、紧空间、一致空间、复形和扩张子、逆极限和展开定理、Arhangelskii空间、商空间和映射空间、可数可乘的空间族.正文前的绪论简要地叙述了阅读本书所需的集合论的基本知识。书中有大量的例题和习题，有益于加强基本训练。 《拓扑空间论》可供大学数学系高年级学生、研究生、教师及有关方面的研究人员参考。

《拓朴实验》由上海教育出版社出版。

《拓扑学》(原书第2版)系统讲解拓扑学理论知识。在美国大学作为教材近20年，最近由原作者进行了全面更新。第一部分为一般拓扑学，讲述点集拓扑学的内容，介绍作为核心题材的集合论、拓扑空问、连通性、紧致性以及可数性公理和分离性公理；第二部分为代数拓扑学，讲述与拓扑学核心题材相关的主题，其中包括基本群和覆叠空问及其应用。 　　《拓扑学》(原书第2版)最大的特点在于概念引入自然，循序渐进。对于疑难的推理证明，将其分解为简化的步骤，不给读者留下疑惑。此外，书中还提供了大量练习，可以巩固加深学习的效果。严格的论证、清晰的条理、丰富的实例，让深奥的拓扑学变得轻松易学。

这是一本拓扑学的入门书籍。本书的特点是：1.注重培养学生的几何直观能力；2.对于单纯同调的处理重点比较突出，使主要线索不至于被复杂的细节所掩盖；3.注意使抽象理论与具体应用保持平衡。 全书内容包括：引言，连续性，紧致性和连通性，粘合空间，基本群，单纯剖分，曲面，单纯同调，映射度与Leschetz数，纽结与复迭空间。 读者对象为大学数学系学生、研究生，以及需要拓扑学知识的科技人员、教师等。

“这是一本不可多得的优秀教材，内容精心选择，阐述出色，图示丰富……对于作者来说，拓扑学首先是一门几何学……” ——数学公报（MATHEMATICAL GAZETTE） 本书是一部拓扑学入门书籍，主要介绍了拓扑空间中的拓扑不变量，以及相应的计算方法。内容涉及点集拓扑、几何拓扑、代数拓扑中的各类方法及其应用，包含139个图示和350个难度各异的思考题，有助于培养学生的几何直观能力，加强对书中内容的理解。本书注重抽象理论与具体应用相结合，要求读者具有实分析、初等群论和线性代数的知识。作者在选材和阐述上都着意体现数学的美，注重培养读者的直觉，经常从历史的观点介绍拓扑学。 本书是许多国外知名高校的拓扑学指定教材，在我国也被许多大学采用。

《基本拓扑学(英文版)》主要内容：This is a topology book for undergraduates,and in writing it I have had two aims in mind.Firstly,to make sure the student sees a variety of defferent techniques and applications involving point set,geometric,and algebraic topology,without celving too deeply into any particular area.Secondly,to develop the reader's geometrical insight;topology is after all a branch of geometry.

This introduction to topology provides separate, in-depth coverage of both general topology and algebraic topology. Includes many examples and figures. GENERAL TOPOLOGY. Set Theory and Logic. Topological Spaces and Continuous Functions. Connectedness and Compactness. Countability and Separation Axioms. The Tychonoff Theorem. Metrization Theorems and paracompactness. Complete Metric Spaces and Function Spaces. Baire Spaces and Dimension Theory. ALGEBRAIC TOPOLOGY. The Fundamental Group. Separation Theorems. The Seifert-van Kampen Theorem. Classification of Surfaces. Classification of Covering Spaces. Applications to Group Theory. For anyone needing a basic, thorough, introduction to general and algebraic topology and its applications.

This introduction to topology provides separate, in-depth coverage of both general topology and algebraic topology. Includes many examples and figures. GENERAL TOPOLOGY. Set Theory and Logic. Topological Spaces and Continuous Functions. Connectedness and Compactness. Countability and Separation Axioms. The Tychonoff Theorem. Metrization Theorems and paracompactness. Complete Metric Spaces and Function Spaces. Baire Spaces and Dimension Theory. ALGEBRAIC TOPOLOGY. The Fundamental Group. Separation Theorems. The Seifert-van Kampen Theorem. Classification of Surfaces. Classification of Covering Spaces. Applications to Group Theory. For anyone needing a basic, thorough, introduction to general and algebraic topology and its applications.

《基础拓扑学讲义》是拓扑学的入门教材。内容包括点集拓扑与代数拓扑，重点介绍代数拓扑学中的基本概念、方法和应用。共分八章：拓扑空间的基本概念,紧致性和连通性，商空间与闭曲面，同伦与基本群，复叠空间，单纯同调及其应用，映射度与不动点等。每节配备了适量习题并在书末附有解答与提示。《基础拓扑学讲义》叙述深入浅出，例题丰富，论证严谨，重点突出；强调几何背景，注意培养学生的几何直观能力；方法新颖，特别是关于对径映射的映射度的计算颇具新意。

本书作者在拓扑学领域享有盛誉。 本书分为两个独立的部分；第一部分普通拓扑学，讲述点集拓扑学的内容；前4章作为拓扑学的引论，介绍作为核心题材的集合论、拓扑空间。连通性、紧性以及可数性和分离性公理；后4章是补充题材；第二部分代数拓扑学，讲述与拓扑学核心题材相关的主题，其中包括基本群和覆盖空间及其应用。 本书最大的特点在于对理论的清晰阐述和严谨证明，力求让读者能够充分理解。对于疑难的推理证明，将其分解为简化的步骤，不给读者留下疑惑。此外，书中还提供了大量练习，可以巩固加深学习的效果。严格的论证，清晰的条理、丰富的实例，让深奥的拓扑学变得轻松易学。

代数拓扑的微分形式，ISBN：9787506201124，作者：（美）Raoul Bott，（美）Loring W.Tu著

In most mathematics departments at major universities one of the three or four basic first-year graduate courses is in the subject of algebraic topology. This introductory textbook in algebraic topology is suitable for use in a course or for self-study, featuring broad coverage of the subject and a readable exposition, with many examples and exercises. The four main chapters present the basic material of the subject: fundamental group and covering spaces, homology and cohomology, higher homotopy groups, and homotopy theory generally. The author emphasizes the geometric aspects of the subject, which helps students gain intuition. A unique feature of the book is the inclusion of many optional topics which are not usually part of a first course due to time constraints, and for which elementary expositions are sometimes hard to find. Among these are: Bockstein and transfer homomorphisms, direct and inverse limits, H-spaces and Hopf algebras, the Brown representability theorem, the James reduced product, the Dold-Thom theorem, and a full exposition of Steenrod squares and powers. Researchers will also welcome this aspect of the book.