The antifield Koszul–Tate complex of reducible Noether identities
From MaRDI portal
Publication:3438651
DOI10.1063/1.2054647zbMath1111.70026arXivmath-ph/0506034OpenAlexW2100876524MaRDI QIDQ3438651
Denis Bashkirov, Luigi Mangiarotti, Gennadi A. Sardanashvily, Giovanni Giachetta
Publication date: 16 May 2007
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math-ph/0506034
Lagrangian formalism and Hamiltonian formalism in mechanics of particles and systems (70S05) Symmetries and conservation laws in mechanics of particles and systems (70S10)
Related Items (7)
GRADED INFINITE ORDER JET MANIFOLDS ⋮ The KT-BRST complex of a degenerate Lagrangian system ⋮ Variations by generalized symmetries of local Noether strong currents equivalent to global canonical Noether currents ⋮ REMARKS ON EXISTENCE OF PROPER ACTION FOR REDUCIBLE GAUGE THEORIES ⋮ On the notion of gauge symmetries of generic Lagrangian field theory ⋮ GRADED LAGRANGIAN FORMALISM ⋮ CLASSICAL FIELD THEORY: ADVANCED MATHEMATICAL FORMULATION
Cites Work
- Unnamed Item
- Unnamed Item
- Homological perturbation theory and the algebraic structure of the antifield-antibracket formalism for gauge theories
- Smoothness and locality for nonunital spectral triples
- Local BRST cohomology in gauge theories
- Existence, uniqueness and cohomology of the classical BRST charge with ghosts of ghosts
- Lagrangian supersymmetries depending on derivatives. Global analysis and cohomology
- Noether’s second theorem for BRST symmetries
- Noether's second theorem in a general setting: reducible gauge theories
- NOETHER IDENTITIES OF A DIFFERENTIAL OPERATOR: THE KOSZUL–TATE COMPLEX
- Jet coordinates for local BRST cohomology
This page was built for publication: The antifield Koszul–Tate complex of reducible Noether identities
