Solving general gauge theories on inner product spaces
Abstract
By means of a generalized quartet mechanism we show in a model independent way that a BRST quantization on an inner product space leads to physical states of the form |ph>=e[Q, ] |ph>0 where Q is the nilpotent BRST operator, a hermitian fermionic gauge fixing operator, and |ph>0 BRST invariant states determined by a hermitian set of BRST doublets in involution. |ph>0 does not belong to an inner product space although |ph> does. Since the BRST quartets are split into two sets of hermitian BRST doublets there are two choices for |ph>0 and the corresponding . When applied to general, both irreducible and reducible, gauge theories of arbitrary rank within the BFV formulation we find that |ph>0 are trivial BRST invariant states which only depend on the matter variables for one set of solutions, and for the other set |ph>0 are solutions of a Dirac quantization. This generalizes previous Lie group solutions obtained by means of a bigrading.
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