Elements of Fedosov Geometry in Lagrangian BRST Quantization

Abstract

A Lagrangian BRST quantization for generic gauge theories in general irreducible non-Abelian hypergauges is proposed on a basis of the multilevel Batalin--Tyutin formalism and a special BV--BFV dual description for a reducible gauge model in a symplectic supermanifold M0 locally parameterized by antifields for Lagrangian multipliers and by the fields of the BV method. The quantization rules are based on a set of nilpotent anticommuting operators M, VM, UM defined using some odd and even symplectic structures in a supersymplectic manifold M whose local representation is an odd (co)tangent bundle over M0 provided by the choice of a flat Fedosov connection and a compatible non-symplectic metric in M0. The generating functional of Green's functions is constructed in terms of general coordinates in M with the help of contracting homotopy operators with respect to VM and UM. We prove the gauge independence of the S-matrix and derive the Ward identity.

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