|Series||Cambridge tracts in mathematics and mathematical physics,, no. 28|
|LC Classifications||QA360 .C3 1952|
|The Physical Object|
|Number of Pages||115|
|LC Control Number||52009985|
Dictionary of Conformal Representations by H. Kober and a great selection of related books, art and collectibles available now at Based on lectures by a noted mathematician, this text offers an essential background in conformal representation. Subjects include the Möbius transformation, non-Euclidean geometry, elementary transformations, Schwarz's Lemma, transformation of the frontier and closed surfaces, and the general theorem of uniformization. Clearly detailed proofs accompany this lucid introduction. Additional Physical Format: Online version: Carathéodory, Constantin, Conformal representation. Cambridge [Eng.] University Press, Conformal representation. Cambridge [England] University Press, (OCoLC) Document Type: Book: All Authors / Contributors: Constantin Carathéodory. Find more information about: OCLC Number: Description: pages illustrations 22 cm. Series Title: Cambridge.
I would recommend the book Introduction to Conformal Field theory by Blumenhagen and Plauschinn. It is quite sort and can serve as a perfect introduction to CFT. It covers the basics of CFT in the first 3 chapters and then in the remaining 3 it goes on to introduce the CFT concepts that will appear most frequently in String theory. Dictionary of conformal representations Dover books on advanced mathematics Dover Books on Science Volume of Dover Science Books: Author: H. Kober: Edition: 2: Publisher: Dover Publications, Length: pages: Subjects. Representation theory, algebraic combinatorics, etc. Conformal field theory led to Kac and l's study of the basic representation of an affine Lie algebra, which appeared in string theory. This representation, and more generally the highest weight integrable representations of affine Lie algebras, appeared in unexpected places. Professor Carathodory sets out the basic theory of conformal representations as simply as possible. In the early chapters on Mobius' and other elementary transformations and on non-Euclidean geometry, he deals with those elementary subjects that are necessary for an understanding of the Price: $
Product Information. Based on lectures by a noted mathematician, this text offers an essential background in conformal representation. Subjects include the Möbius transformation, non-Euclidean geometry, elementary transformations, Schwarz's Lemma, transformation of the frontier and closed surfaces, and the general theorem of uniformization. In cartography, a conformal map projection is one in which every angle between two curves that cross each other on Earth (a sphere or an ellipsoid) is preserved in the image of the projection, i.e. the projection is a conformal map in the mathematical sense. For example, if two roads cross each other at a 39° angle, then their images on a map with a conformal projection cross at a . Further reading. Ahlfors, Lars V. (), Conformal invariants: topics in geometric function theory, New York: McGraw–Hill Book Co., MR Constantin Carathéodory () Conformal Representation, Cambridge Tracts in Mathematics and Physics; Chanson, H. (), Applied Hydrodynamics: An Introduction to Ideal and Real Fluid Flows, CRC Press, Taylor & Francis . A source book in mathematics by Smith, David Eugene, Publication date Topics Mathematics Publisher New York: McGraw-Hill Book Co. Collection northeastern; blc; americana Digitizing sponsor Boston Library Consortium Member Libraries Contributor Northeastern University, Snell Library Language :