Detailed Information on Publication Record
1998
Superfield Quantization
BATALIN, Igor, Klaus BERING LARSEN and Poul Henrik DAMGAARDBasic information
Original name
Superfield Quantization
Authors
BATALIN, Igor (643 Russian Federation), Klaus BERING LARSEN (208 Denmark, guarantor, belonging to the institution) and Poul Henrik DAMGAARD (208 Denmark)
Edition
NUCLEAR PHYSICS B, The Netherlands, ELSEVIER SCIENCE BV, 1998, 0550-3213
Other information
Language
English
Type of outcome
Článek v odborném periodiku
Field of Study
10303 Particles and field physics
Country of publisher
Netherlands
Confidentiality degree
není předmětem státního či obchodního tajemství
References:
Impact factor
Impact factor: 3.322
RIV identification code
RIV/00216224:14310/98:00039894
Organization unit
Faculty of Science
UT WoS
000072937200021
Keywords in English
BATALIN-VILKOVISKY FORMALISM; DYNAMICAL-SYSTEMS SUBJECT; QUANTUM GAUGE-THEORIES; SUPERSPACE FORMULATION; 1ST-CLASS CONSTRAINTS; BRST QUANTIZATION; GEOMETRY; SYMMETRY; ALGEBRA; BOSON
Tags
International impact, Reviewed
Změněno: 17/3/2019 17:15, doc. Klaus Bering Larsen, Ph.D.
V originále
We present a superfield formulation of the quantization program for theories with first class constraints. An exact operator formulation is given, and we show how to set up a phase-space path integral entirely in terms of superfields. BRST transformations and canonical transformations enter on equal footing, and they allow us to establish a superspace analog of the BFV theorem. We also present a formal derivation of the Lagrangian superfield analogue of the field-antifield formalism, by an integration over half of the phase-space variables.
In Czech
We present a superfield formulation of the quantization program for theories with first class constraints. An exact operator formulation is given, and we show how to set up a phase-space path integral entirely in terms of superfields. BRST transformations and canonical transformations enter on equal footing, and they allow us to establish a superspace analog of the BFV theorem. We also present a formal derivation of the Lagrangian superfield analogue of the field-antifield formalism, by an integration over half of the phase-space variables.