VON UNGE, Rikard, Maxim ZABZINE, Ulf LINDSTRÖM and Martin ROCEK. Linearizing Generalized Kahler Geometry. Journal of High Energy Physics. CERN, 2007, vol. 2007, No 4, p. nestránkováno, 31 pp. ISSN 1126-6708.
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Basic information
Original name Linearizing Generalized Kahler Geometry
Name in Czech Linearizace zobecneni Kahlerova geometrie
Authors VON UNGE, Rikard (752 Sweden, guarantor, belonging to the institution), Maxim ZABZINE (643 Russian Federation), Ulf LINDSTRÖM (752 Sweden) and Martin ROCEK (840 United States of America).
Edition Journal of High Energy Physics, CERN, 2007, 1126-6708.
Other information
Original language English
Type of outcome Article in a journal
Field of Study 10301 Atomic, molecular and chemical physics
Country of publisher United Kingdom of Great Britain and Northern Ireland
Confidentiality degree is not subject to a state or trade secret
WWW article
Impact factor Impact factor: 5.659
RIV identification code RIV/00216224:14310/07:00050762
Organization unit Faculty of Science
UT WoS 000246396400061
Keywords in English Generalized complex geometry; Sigma models; supersymmetry
Tags generalized complex geometry, rivok, sigma models, supersymmetry, ZR
Tags International impact, Reviewed
Changed by Changed by: Ing. Andrea Mikešková, učo 137293. Changed: 20/4/2012 09:00.
Abstract
The geometry of the target space of an N=(2,2) supersymmetry sigma-model carries a generalized Kahler structure. There always exists a real function, the generalized Kahler potential K, that encodes all the relevant local differential geometry data: the metric, the B-field, etc. Generically this data is given by nonlinear functions of the second derivatives of K. We show that, at least locally, the nonlinearity on any generalized Kahler manifold can be explained as arising from a quotient of a space without this nonlinearity.
Abstract (in Czech)
Geometrie ciloveho prostoru N=(2,2) supersymmetricky sigma model nosi zobecneni Kahler strukturu. Vzdycky existuje realni funkce, zobecneni Kahlerovsky potential K, ktera obsahuje vsechny differentialni geometricke data, metrika, B-pole, etc. Obecne tuto data je vyadreni pomoci nelinearni funkce druhe derivace K. My dokazeme, ze lokalni, tuto nelinearnosti se da vysvetlovat pomoci kvocient z prostoru bez nelinearity.
Links
ME 649, research and development projectName: Nekomutativní teorie pole a projektivní superprostor
Investor: Ministry of Education, Youth and Sports of the CR, Non-comutative theory of field and projective superspace, Research and Development Programme KONTAKT (ME)
MSM0021622409, plan (intention)Name: Matematické struktury a jejich fyzikální aplikace
Investor: Ministry of Education, Youth and Sports of the CR, Mathematical structures and their physical applications
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