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Equivariant Cohomology and Localization of Path Integrals
Richard J. Szabo
€ 128.07
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Description for Equivariant Cohomology and Localization of Path Integrals
Paperback. Series: Lecture Notes in Physics Monographs (Closed). Num Pages: 326 pages, biography. BIC Classification: PBKS; PBP; PBPD; PHP; PHQ; PHU. Category: (P) Professional & Vocational. Dimension: 235 x 155 x 18. Weight in Grams: 504.
This book, addressing both researchers and graduate students, reviews equivariant localization techniques for the evaluation of Feynman path integrals. The author gives the relevant mathematical background in some detail, showing at the same time how localization ideas are related to classical integrability. The text explores the symmetries inherent in localizable models for assessing the applicability of localization formulae. Various applications from physics and mathematics are presented.
This book, addressing both researchers and graduate students, reviews equivariant localization techniques for the evaluation of Feynman path integrals. The author gives the relevant mathematical background in some detail, showing at the same time how localization ideas are related to classical integrability. The text explores the symmetries inherent in localizable models for assessing the applicability of localization formulae. Various applications from physics and mathematics are presented.
Product Details
Format
Paperback
Publication date
2013
Publisher
Springer-Verlag Berlin and Heidelberg GmbH & Co. KG Germany
Number of pages
326
Condition
New
Series
Lecture Notes in Physics Monographs (Closed)
Number of Pages
315
Place of Publication
Berlin, Germany
ISBN
9783662142844
SKU
V9783662142844
Shipping Time
Usually ships in 15 to 20 working days
Ref
99-15
Reviews for Equivariant Cohomology and Localization of Path Integrals
"A thorough exposition of the current state of applying equivariant cohomology to quantum field theory. [...] If one takes the attitude that this material may make mathematical sense within the next fifty years, the book can be appreciated as a well-organized exposition of the topological content of quantum field theory from a physics viewpoint." (Mathematical Reviews 2002a)