《最优化理论与方法》全面、系统地介绍了无约束最优化、约束最优化和非光滑最优化的理论和计算方法，它包括了近年来国际上关于优化研究的最新成果。《最优化理论与方法》在经济计划、工程设计、生产管理、交通运输等方面得到了广泛应用。

Algebraic topology is a basic part of modern mathematics and some knowledge of this area is indispensable for any advanced work relating to geometry, including topology itself, differential geometry, algebraic geometry and Lie groups. This book provides a treatment of algebraic topology both for teachers of the subject and for advanced graduate students in mathematics either specializing in this area or continuing on to other fields. J. Peter May's approach reflects the enormous internal developments within algebraic topology, most of which are largely unknown to mathematicians in other fields. But he also retains the classical presentations of various topics where appropriate. Most chapters end with problems that further explore and refine the concepts presented. The final four chapters provide sketches of substantial areas of algebraic topology and the book concludes with a list of suggested readings for those interested in delving further into the field.

本书详细介绍非线性动力系统高维定性理论和分支理论（局部和大范围）。本教材共分两卷。第二卷主要介绍高维动力系统的分支理论，共分8章和一个附录（例子，问题和练习），主要内容有：结构稳定系统、动力系统的分支、平衡态和周期轨线的稳定性边界上动力系统的性态、通往稳定性边界的局部分支、鞍-结点平衡态以及周期轨道消失时的大范围分支、鞍点平衡态的同宿回路分支、安全和危险的稳定性边界。本书可作为大学数学系高年级本科生、研究生和教师的教科书和教学参考书，也可供非线性动力学和动力系统其它方面的工程师、学生、教师、学者和专家学习。

《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.

Now available in paperback, this successful radical approach to complex analysis replaces the standard calculational arguments with new geometric ones. With several hundred diagrams, and far fewer prerequisites than usual, this is the first visual intuitive introduction to complex analysis. Although designed for use by undergraduates in mathematics and science, the novelty of the approach will also interest professional mathematicians.

These Lecture Notes are an expanded version of the Fermi Lectures Atiyah gave at Scuola Normale Superiore in Pisa, the Loeb Lectures at Harvard and the Whittemore Lectures at Yale, in 1978. In all cases he was addressing a mixed audience of mathematicians and physicists and the presentation had to be tailored accordingly. Throughout, Atiyah presented the mathematical material in a somewhat unorthodox order, following a pattern which he felt would relate the new techniques to familiar ground for physicists.
The main new results presented in the lectures, namely the construction of all multi-istanton solutions of Yang-Mills fields, is the culmination of several years of fruitful interaction between many physicists and mathematicians. The major breakthrough came with the observation by Ward that the complex methods developed by Penrose in his “twistor programme” were ideally suited to the study of the Yang-Mills equations. The instanton problem was then seen to be equivalent to a problem in complex analysis and to one in algebraic geometry. Using the powerful methods of modern algebraic geometry it was not long before the problem was finally solved.

《选举几何学》内容简介：“绝对公平的选举是不可能实现的!”当美国经济学家K.J.Arrow在1952年向世界发表这一定理时，人们才开始真正认识决策和民主。自此，选举学正式成为一种独立完整的理论。《选举几何学》从介绍Arrow定理及其简化版的证明入手，进而讨论后Arrow时代选举理论的面貌，即D.G.Saari（他创建了初等几何学方法）和G.Chichilnisky（她创建了拓扑方法）对选举理论所作的重要贡献。阅读《选举几何学》可以了解社会发展中令人意想不到的真实轨迹，更重要的是，学会如何应用最为恰当的选择方法，让智慧指导生活决策。《选举几何学》可供管理人员、决策人员等社会各界人士阅读，也可供高等院校及科研机构的数理社会学研究人员、相关专业师生参考和使用。

For physics students interested in the mathematics they use, and for math students interested in seeing how some of the ideas of their discipline find realization in an applied setting. The presentation strikes a balance between formalism and application, between abstract and concrete. The interconnections among the various topics are clarified both by the use of vector spaces as a central unifying theme, recurring throughout the book, and by putting ideas into their historical context. Enough of the essential formalism is included to make the presentation self-contained.

本书详细介绍非线性动力系统高维定性理论和分支理论（局部和大范围）。本教材共分两卷。第一卷共有6章和两个附录，主要内容有：动力系统基本概念、动力系统的结构稳定平衡态和结构稳定周期轨线、不变环面、局部和非局部中心流形理论、以及鞍点平衡态附近系统的特殊形式和鞍点不动点附近轨线的一阶渐近。本书可作为大学数学系高年级本科生、研究生和教师的教科书和教学参考书，也可供非线性动力学和动力系统其它方面的学生、教师、工程师、学者和专家学习和参考。

This book provides a grounded introduction to the fundamental concepts of mathematics, neuroscience and their combined use, thus providing the reader with a springboard to cutting-edge research topics and fostering a tighter integration of mathematics and neuroscience for future generations of students. The book alternates between mathematical chapters, introducing important concepts and numerical methods, and neurobiological chapters, applying these concepts and methods to specific topics. It covers topics ranging from classical cellular biophysics and proceeding up to systems level neuroscience. Starting at an introductory mathematical level, presuming no more than calculus through elementary differential equations, the level will build up as increasingly complex techniques are introduced and combined with earlier ones. Each chapter includes a comprehensive series of exercises with solutions, taken from the set developed by the authors in their course lectures. MATLAB code is included for each computational figure, to allow the reader to reproduce them. Biographical notes referring the reader to more specialized literature and additional mathematical material that may be needed either to deepen the reader's understanding or to introduce basic concepts for less mathematically inclined readers completes each chapter.

A very didactic and systematic introduction to mathematical concepts of importance for the analysis of data and the formulation of concepts based on experimental data in neuroscience
Provides introductions to linear algebra, ordinary and partial differential equations, Fourier transforms, probabilities and stochastic processes
Introduces numerical methods used to implement algorithms related to each mathematical concept
Illustrates numerical methods by applying them to specific topics in
neuroscience, including Hodgkin-Huxley equations, probabilities to describe stochastic release, stochastic processes to describe noise in neurons, Fourier transforms to describe the receptive fields of visual neurons
Provides implementation examples in MATLAB code, also included for download on the accompanying support website (which will be updated with additional code and in line with major MATLAB releases)
Allows the mathematical novice to analyze their results in more sophisticated ways, and consider them in a broader theoretical framework

《数学名著译丛•常微分方程》用现代数学观点阐述常微分方程论中的一些基本问题，《数学名著译丛•常微分方程》共分五章：基本概念，基本理论，线性系统，基本定理的证明和流形上的微分方程，《数学名著译丛•常微分方程》特点是注重几何和定性的考察，并且特别强调在力学中的应用。《数学名著译丛•常微分方程》论述严谨，深入浅出，并有大量图形、例题和问题，书后附有典型练习题，有助于读者深入理解《数学名著译丛•常微分方程》的内容。
《数学名著译丛•常微分方程》可供大学数学系高年级学生、研究生、教师及其他数学工作者参考。

数学与音乐有着怎样的奇妙关系？本书以通俗的语言再现数学与音乐知识的发现思路，从数学、音乐各自角度讲解了两门学科的本质精神，并由此阐释了两者之间的奇妙关联和各自的"创造"的方法。没有复杂拗口的专业术语，用最基本的认知和逻辑创造属于自己的数学与音乐吧！

《微积分和数学分析引论(共2册)》分两卷，地一卷为单变量情形，第二卷为多变量情形。第一卷中译本分两册出版。《微积分和数学分析引论(共2册)》为第一卷第一分册，包括前三章，主要接受函数、极限、微分和积分的基本概念及其运算。《微积分和数学分析引论(共2册)》包含大量的例题和习题，有助于读者理解《微积分和数学分析引论(共2册)》的内容。

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。