★★★★★★★★★★★★★★★★
本站购买电子书等资源使用支付宝,无需注册直接付费后((弹出错误页面服务器忙,请稍等再试))不要关闭页面待页面电脑PC自动刷新(手机端需从支付宝页面按手机浏览器左上角返回键回到本页面,再自行手动刷新网页,推荐电脑访问)显示下载链接!不推荐edge等太高级的浏览器下载链接会阻拦,推荐迅雷、IDM等工具!请立刻及时下载(另存为)以免下次访问失效!如果有问题请在页面底部留言反馈(留下你的邮箱,仅限邮件交流,或在文章中更新交代回复)!部分带OCR版本的pdf书可以复制文字或搜索内容。下载失败了怎么办:点击这里
★★★★★★★★★★★★★★★★
对本站的直接交易方式不放心?你可以花1元购买美女短视频体验交易流程:点击这里,或者花2元预览资源截图或电子书内页:点击这里
PDF扫描版和图文版的区别,以及其他Word、mobi、txt、epub、azw3等各种电子版格式的选择:点击这里
本文链接:
https://www.lifu.me/dzs-00197.html
物理学家用的张量和群论导论-13628032.pdf 文件大小:037.88 MB
下载地址:
物理学家用的张量和群论导论(英文版)
作者:Nadir Jeevanjee出版社:世界图书出版公司出版时间:2014年03月
366条评论
当当价 ¥37.00(7.56折)
开 本:24开
纸 张:胶版纸
包 装:平装
是否套装:否
国际标准书号ISBN:9787510070266
所属分类:
图书>自然科学>物理学>理论物理学
内容简介
This book is composed of two parts: Part I (Chaps. I through 3) is an introduction to tensors and their physical applications, and Part II (Chaps. 4 through 6) introduces group theory and intertwines it with the earlier material. Both parts are written at the advanced-undergraduate/beginning graduate level, although in the course of’ Part II the sophistication level rises somewhat. Though the two parts differ somewhat in flavor,l have aimed in both to fill a (perceived) gap in the literaiure by connecting
the component formalisms prevalent in physics calculations to the abstract but more conceptual formulations found in the math literature. My firm beliefis that we need to see tensors and groups in coordinates to get a sense of how they work, but also need an abstract formulation to understand their essential nature and organize our thinking about them.
目 录
Part I Linear Algebra and Tensors
I A Quicklntroduction to Tensors
2 VectorSpaces
2.1 Definition and Examples
2.2 Span,Linearlndependence,and Bases
2.3 Components
2.4 LinearOperators
2.5 DuaISpaces
2.6 Non-degenerate Hermitian Forms
2.7 Non-degenerate Hermitian Forms and Dual Spaces
2.8 Problems
3 Tensors
3.1 Definition and Examples
3.2 ChangeofBasis
3.3 Active and Passive Transformations
3.4 The Tensor Product-Definition and Properties
3.5 Tensor Products of V and V*
3.6 Applications ofthe Tensor Product in Classical Physics
3.7 Applications of the Tensor Product in Quantum Physics
3.8 Symmetric Tensors
3.9 Antisymmetric Tensors
3.10 Problems
Partll GroupTheory
4 Groups, Lie Groups,and Lie Algebras
4.1 Groups-Definition and Examples
4.2 The Groups ofClassical and Quantum Physics
4.3 Homomorphismandlsomorphism
4.4 From Lie Groups to Lie Algebras
4.5 Lie Algebras-Definition,Properties,and Examples
4.6 The Lie Algebras ofClassical and Quantum Physics
4.7 AbstractLieAlgebras
4.8 Homomorphism andlsomorphism Revisited
4.9 Problems
5 Basic Representation Theory
5.1 Representations: Definitions and Basic Examples
5.2 FurtherExamples
5.3 TensorProduet Representations
5.4 Symmetric and Antisymmetric Tensor Product Representations
5.5 Equivalence ofRepresentations
5.6 Direct Sums andlrreducibility
5.7 Moreonlrreducibility
5.8 Thelrreducible Representations ofsu(2),SU(2) and S0(3)
5.9 ReaIRepresentations andComplexifications
5.10 The Irreducible Representations of st(2, C)nk, SL(2, C) andS0(3,1)o
5.11 Irreducibility and the Representations of 0(3, 1) and Its Double Covers
5.12 Problems
6 The Wigner-Eckart Theorem and Other Applications
6.1 Tensor Operators, Spherical Tensors and Representation Operators
6.2 Selection Rules and the Wigner-Eckart Theorem
6.3 Gamma Matrices and Dirac Bilinears
6.4 Problems
Appendix Complexifications of Real Lie Algebras and the Tensor
Product Decomposition ofsl(2,C)rt Representations
A.1 Direct Sums and Complexifications ofLie Algebras
A.2 Representations of Complexified Lie Algebras and the Tensor
Product Decomposition ofst(2,C)R Representations
References
Index
