LINDSTRÖM, Ulf, Martin ROČEK, Itai RYB, Rikard VON UNGE and Maxim ZABZINE. T-duality and Generalized Kahler Geometry. Journal of High Energy Physics. CERN, 2008, vol. 2008, No 2, p. nestránkováno, 14 pp. ISSN 1126-6708.
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Basic information
Original name T-duality and Generalized Kahler Geometry.
Name in Czech T-dualita a zobecňení komplexní geometrie.
Authors LINDSTRÖM, Ulf (752 Sweden), Martin ROČEK (840 United States of America), Itai RYB (380 Italy), Rikard VON UNGE (752 Sweden, guarantor, belonging to the institution) and Maxim ZABZINE (643 Russian Federation).
Edition Journal of High Energy Physics, CERN, 2008, 1126-6708.
Other information
Original language English
Type of outcome Article in a journal
Field of Study 10303 Particles and field physics
Country of publisher United Kingdom of Great Britain and Northern Ireland
Confidentiality degree is not subject to a state or trade secret
WWW eprint
Impact factor Impact factor: 5.375
RIV identification code RIV/00216224:14310/08:00050980
Organization unit Faculty of Science
UT WoS 000254764400056
Keywords in English supersymmetry; generalized complex geometry
Tags generalized complex geometry, Pb, rivok, supersymmetry
Tags International impact, Reviewed
Changed by Changed by: Ing. Andrea Mikešková, učo 137293. Changed: 20/4/2012 09:20.
Abstract
We use newly discovered N = (2, 2) vector multiplets to clarify T-dualities for generalized Kahler geometries. Following the usual procedure, we gauge isometries of nonlinear sigma-models and introduce Lagrange multipliers that constrain the field-strengths of the gauge fields to vanish. Integrating out the Lagrange multipliers leads to the original action, whereas integrating out the vector multiplets gives the dual action. The description is given both in N = (2, 2) and N = (1, 1) superspace.
Abstract (in Czech)
Použiváme nově nalezené N=(2,2) vektorové multiplety abychom objasnili T-duality pro zobecňení Kählerová geometrii. Obvyklým způsobem kalibrujeme isometrii nelinearních sigma modely a přidáme Lagrangeovy multiplikátory které podmíní fieldstrength aby byl nula. Když integrujeme vektorový multiplety dostaneme duální účinek. Popis je v N=(2,2) i v N=(1,1) superprostoru.
Links
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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