Generalization of Faddeev--Popov Rules in Yang--Mills Theories: N=3,4 BRST Symmetries

Abstract

The Faddeev-Popov rules for quantization of theory with gauge group are generalized for case of nvariance of quantum actions, SN, on N-parametric Abelian SUSY transformations with odd parameters λp, p=1,..,N and anticommuting generators sp, for N=3,4 implying substitution of ghost fields N-plet, Cp multipled on λp, instead of the parameter, , of gauge transformations. Total configuration spaces for quantum theory of the same classical model coincide for N=3 ,4 cases. For N=3 transformations the superspace of irrep includes in addition 3 ghost Cp, 3 even Bpq and odd B fields for p,q=1-3. It is shown for quantum action S3 the gauge-fixing by adding to classical action of N=3-exact term requires 1 antighost C, 3 even Bp 3 odd Bp and Nakanishi--Lautrup fields. Action of N=3 transformations on the latter fields is found. The transformations appear by N=3 BRST ones for the vacuum functional, Z3(0) . It is shown, the configuration space appears by irrep superspace for fields 4 for N=4- transformations containing in addition to Aμ: (4+6+4+1) ghost-antighost Cr, even Brs, odd Br fields and B. Action S4 is constructed by adding to classical action of N=4-exact with gauge boson F4 as compared to gauge fermion 3 for N=3 case. Procedure is valid for any admissible gauge. The equivalence with N=1 BRST-invariant quantization method is explicitly found. Finite N=3,4 BRST transformations are derived from algebraic transformations. Respective Jacobians for field-dependent parameters are calculated. They imply the presence of corresponding modified Ward identity to be reduced to new (usual) Ward identities for constant parameters and describe the problem of gauge-dependence. Introduction into diagrammatic Feynman techniques for N=3,4 cases is suggested.