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微积分五讲
《微积分五讲》从现代数学的观点以及矛盾的观点来重新审视与认识微积分。用通俗的语言讲述了微积分从哪里来、微积分的三个发展阶段、微积分严格化后走向哪里、微积分的主要矛盾,尤其用外微分形式的观点来说清楚高维空间上微积分的主要矛盾,用矛盾的观点来梳理微积分中的定理与公式等,使读者从高一个层次上来认识微积分。 -
数学与猜想(第二卷)
第二卷系统地论述了合情推理的模式,评述它们彼此之间以及与概率计算的关系,并扼要地讨论了它们与数学发现及教学的关系。 书中将数学中的推理模式与生活中的实例相联系,论述深入浅出,读来令人兴味盎然。全书有大量习题,书末附有习题解答。 -
数学分析(第一卷)
数学分析(第1卷第4版俄罗斯数学教材选译),ISBN:9787040183023,作者:(俄罗斯)B.A.卓里奇 -
Probability Theory
The standard rules of probability can be interpreted as uniquely valid principles in logic. In this book, E. T. Jaynes dispels the imaginary distinction between 'probability theory' and 'statistical inference', leaving a logical unity and simplicity, which provides greater technical power and flexibility in applications. This book goes beyond the conventional mathematics of probability theory, viewing the subject in a wider context. New results are discussed, along with applications of probability theory to a wide variety of problems in physics, mathematics, economics, chemistry and biology. It contains many exercises and problems, and is suitable for use as a textbook on graduate level courses involving data analysis. The material is aimed at readers who are already familiar with applied mathematics at an advanced undergraduate level or higher. The book will be of interest to scientists working in any area where inference from incomplete information is necessary. -
Linear Algebra, 4th Edition
This top-selling, theorem-proof book presents a careful treatment of the principle topics of linear algebra, and illustrates the power of the subject through a variety of applications. It emphasizes the symbiotic relationship between linear transformations and matrices, but states theorems in the more general infinite-dimensional case where appropriate. Chapter topics cover vector spaces, linear transformations and matrices, elementary matrix operations and systems of linear equations, determinants, diagonalization, inner product spaces, and canonical forms. For statisticians and engineers. -
来自圣经的证明
作为一门历史悠久的学问,数学有她自身的文化和美学,就像文学和艺术一样。一方面,数学家们在努力开拓新领域、解决老问题;另一方面他们也在不断地从不同的角度反复学习、理解和欣赏前辈们的工作。的确,数学中有许多不仅值得反复推敲理解,更值得细心品味和欣赏的杰作。有些定理的证明不仅想法奇特、构思精巧,作为一个整体更是天衣无缝。难怪,西方有些虔诚的数学家将这类杰作比喻为上帝的创造。 本书已被译成8种文字。这不是一本教科书,也不是一本专著,而是一本开阔数学视野和提高数学修养的著作。书中介绍了35个著名数学问题的极富创造性和独具匠心的证明。出于可读性的考虑,本书侧重于研究生水平并且局限于数论,几何,分析,组合与图论五个数学领域。但我们确信,每一个数学工作者都会喜欢这本书,并且从中学到许多东西。