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Introduction to Linear Algebra, Fourth Edition
Gilbert Strang's textbooks have changed the entire approach to learning linear algebra -- away from abstract vector spaces to specific examples of the four fundamental subspaces: the column space and nullspace of A and A'. Introduction to Linear Algebra, Fourth Edition includes challenge problems to complement the review problems that have been highly praised in previous editions. The basic course is followed by seven applications: differential equations, engineering, graph theory, statistics, fourier methods and the FFT, linear programming, and computer graphics. Thousands of teachers in colleges and universities and now high schools are using this book, which truly explains this crucial subject. Chapter 1: Introduction to Vectors; Chapter 2: Solving Linear Equations; Chapter 3: Vector Spaces and Subspaces; Chapter 4: Orthogonality; Chapter 5: Determinants; Chapter 6: Eigenvalues and Eigenvectors; Chapter 7: Linear Transformations; Chapter 8: Applications; Chapter 9: Numerical Linear Algebra; Chapter 10: Complex Vectors and Matrices; Solutions to Selected Exercises; Final Exam. Matrix Factorizations. Conceptual Questions for Review. Glossary: A Dictionary for Linear Algebra Index Teaching Codes Linear Algebra in a Nutshell. -
线性代数及其应用
本书全面覆盖线性方程组、矩阵、向量空间、博弈论和数值分析等内容, 理论和应用相结合. 尤其介绍了凸集、对偶定理、赋范[线性]空间、赋范[线性]空间之间的线性映射以及自伴随矩阵本征值的计算等一般教材上没有的内容. 为方便读者学习, 每章都有练习, 并提供解答. 书后还有辛矩阵、洛伦兹群、数值域等16个附录. 本书是一本可供高年级本科生和研究生使用的优秀教材, 同时也是数学教师和相关研究人员的一本很好的参考书. -
应用随机过程
《应用随机过程概率模型导论》是一部经典的随机过程著作, 叙述深入浅出、涉及面广,主要内容有随机变量、条件概率及条件期望、离散及连续马尔可夫链、指数分布、泊松过程、布朗运动及平稳过程、更新理论及排队论等;也包括了随机过程在物理、生物、运筹、网络、遗传、经济、保险、金融及可靠性中的应用,特别是有关随机模拟的内容, 给随机系统运行的模拟计算提供了有力的工具。《应用随机过程概率模型导论》有约700道习题, 其中带星号的习题还提供了解答。 -
代数几何原理
《代数几何原理》主要内容:A third general principle was that this volume should be stir-contained.In particular any "hard" result that would be utilized should be fullyproved. A difficulty a student often faces in a subject as diverse as algebraic geometry is the profusion of cross-references, and this is one reason for attempting to be self-contained. Similarly, we have attempted to avoid allusions to, or statements without proofs of, related results. This book is in no way meant to be a survey of algebraic geometry, but rather is designed to develop a working facility with specific geometric questions.Our approach to the subject is initially analytic: Chapters 0 and 1 treat the basic techniques and results of complex manifold theory, with some emphasis on results applicable to projective varieties. Beginning in Chapter 2 with the theory of Riemann surfaces and algebraic curves, and continu-ing in Chapters 4 and 6 on algebraic surfaces and the quadric line complex, our treatment becomes increasingly geometric along classicallines. Chapters 3 and 5 continue the analytic approach, progressing to more special topics in complex manifolds. -
重温微积分
《重温微积分》根据作者多年来为各种不同程度的大学生和研究生讲课及讨论班上报告的内容整理而成。第一章对极限理论的发展作了历史的回顾。以下六章分别讨论函数、微分学、积分学、傅里叶分析、实分析与点集拓扑学基础以及微分流形理论。每一章都强调有关理论的基本问题、基本理论和基本方法的历史的背景,其与物理科学的内在联系,其现代的发展与陈述方式特别是它与其他数学分支的关系。同时对一些数学和物理学中重要的而学生常常不了解的问题作了阐述。因此,它涉及了除微积分以外的许多数学分支:主要有实和复分析、微分方程、泛函分析、变分法和拓扑学的某些部分。同样对经典物理学-牛顿力学和电磁学作了较深入的讨论。其目的则是引导学生去重新审视和整理自己已学过的数学知识,并为学习新的数学知识——例如数学物理做准备。 《重温微积分》适合于已学过微积分的基本知识的大学生和研究生进一步自学更现代的数学之用,也可以作为讨论班的材料。《重温微积分》还适合需要较多数学的各专业的人员以及高等学校教师参考之用。 -
常微分方程
The first two ch