Theodor Bröcker, Tammo tom Dieck (auth.)9780387136783, 9783540136781, 0387136789, 3540136789
This book is based on several courses given by the authors since 1966. It introduces the reader to the representation theory of compact Lie groups. We have chosen a geometrical and analytical approach since we feel that this is the easiest way to motivate and establish the theory and to indicate relations to other branches of mathematics. Lie algebras, though mentioned occasionally, are not used in an essential way. The material as well as its presentation are classical; one might say that the foundations were known to Hermann Weyl at least 50 years ago. Prerequisites to the book are standard linear algebra and analysis, including Stokes’ theorem for manifolds. The book can be read by German students in their third year, or by first-year graduate students in the United States. Generally speaking the book should be useful for mathematicians with geometric interests and, we hope, for physicists. At the end of each section the reader will find a set of exercises. These vary in character: Some ask the reader to verify statements used in the text, some contain additional information, and some present examples and counter examples. We advise the reader at least to read through the exercises. |
Table of contents : Front Matter….Pages i-x Lie Groups and Lie Algebras….Pages 1-63 Elementary Representation Theory….Pages 64-122 Representative Functions….Pages 123-156 The Maximal Torus of a Compact Lie Group….Pages 157-182 Root Systems….Pages 183-238 Irreducible Characters and Weights….Pages 239-298 Back Matter….Pages 299-316 |
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