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黎曼几何
《黎曼几何》主要内容:The object of this book is to familiarize the reader with the basic language of and some fundamental theorems in Riemannian Geometry. To avoid referring to previous knowledge of differentiable manifolds, we include Chapter 0, which contains those concepts and results on differentiable manifolds which are used in an essential way in the rest of the book。 The first four chapters of the book present the basic concepts of Riemannian Geometry (Riemannian metrics, Riemannian connections, geodesics and curvature). A good part of the study of Riemannian Geometry consists of understanding the relationship between geodesics and curvature. Jacobi fields, an essential tool for this understanding, are introduced in Chapter 5. In Chapter 6 we introduce the second fundamental form associated with an isometric immersion, and prove a generalization of the Theorem Egregium of Gauss. This allows us to relate the notion of curvature in Riemannian manifolds to the classical concept of Gaussian curvature for surfaces。 -
可微流形和李群基础
This book provides the necessary foundation for students interested in any of the diverse areas of mathematics which require the notion of a differentiable manifold. It is designed as a beginning graduate-level textbook and presumes a good undergraduate training in algebra and analysis plus some knowledge of point set topology, covering spaces, and the fundamental group. It is also intended for use as a reference book since it includes a number of items which are difficult to ferret out of the literature, in particular, thecompleteand self-contained proofs of the fundamental theorems of Hodge and de Rham. -
曲线与曲面的微分几何
《曲线与曲面的微分几何》是曲线和曲面局部微分几何学和整体几何学的一本引论,是大学微分几何课程的经典教材。它的内容和取材均相当丰富,习题充足完整,许多章节知识可以籍习题向下作延伸推广。在叙述方法上与传统方式有如下不同:较广泛地应用了线性代数的基本知识,在一定程度上强调了基本的几何事实,并不陷入方法技巧或机遇性的细节中。 -
微分几何入门与广义相对论(中册.第二版)
《微分几何入门与广义相对论(中册·第2版)》中册包含4章(第11~14章)和6个附录(附录B~G)。第11~13章依次介绍时空的整体因果结构、渐近平直时空和:KexT—Newman黑洞,第14章详细讲述与参考系有关的各种问题,包括时空的3+1分解。附录B和C分别简介量子力学的数学基础和几何相,附录D和E分别介绍能量条件和奇性定理,附录F讲述微分几何很重要的Frobenius定理,附录G则用微分几何语言比较详细地讨论了李群和李代数的知识,并专辟一节介绍对物理学特别重要的洛伦兹群和洛伦兹代数。本册仍然贯彻上册深入浅出的写作风格,为降低读者阅读难度采取了多种措施。 《微分几何入门与广义相对论(中册·第2版)》适用于物理系高年级本科生、硕博士研究生和物理工作者,特别是相对论研究者。 -
微分几何讲义
《微分几何讲义》系统地论述了微分几何的基本知识。全书共八章并两个附录。作者以较大的篇幅,即前三章和第六章介绍了流形、多重线性函数、向量场、外微分、李群和活动标架法等基本知识和工具。在有了上述宽广而坚实的基础之后,论述微分几何的核心问题,即联络、黎曼几何以及曲面论等。第七章复流形,既是当前十分活跃的研究领域,也是第一作者研究成果卓著的领域之一,包含有作者独到的见解和简捷的方法。第八章Finsler几何是本书第二版新增的一章,它是第一作者近来提倡的研究课题,其中Chefn联络具有突出的性质,使得黎曼几何成为Finsler几何的特殊情形。最后两个附录,介绍了大范围曲线论和曲面论,以及对微分几何与理论物理关系的论述,为这两个活跃的前沿领域提出了不少进一步的研究课题。 -
黎曼几何
《黎曼几何(第2版)(影印版)》介绍黎曼几何中的重要技巧和定理,为满足那些希望专门研究黎曼几何的学生,书中还包含大量关于较深论题的背景材料。《黎曼几何(第2版)(影印版)》还介绍了最新的研究闷题。各种练习散布全书,帮助读者深入理解书中内容。