Note on the Gauge Fixing in Gauge Theory

Abstract

In the absence of Gribov complications, the modified gauge fixing in gauge theory ∫ DAμ\[-SYM(Aμ)-∫ f(Aμ)dx] /∫ Dg[-∫ f(Aμg)dx]\ for example, f(Aμ)=(1/2)(Aμ)2, is identical to the conventional Faddeev-Popov formula ∫ DAμ\δ(Dμδ f(A)δ Aμ)/∫ Dgδ(Dμδ f(Ag) δ Aμg)\[-SYM(Aμ)] if one takes into account the variation of the gauge field along the entire gauge orbit. Despite of its quite different appearance,the modified formula defines a local and BRST invariant theory and thus ensures unitarity at least in perturbation theory. In the presence of Gribov complications, as is expected in non-perturbative Yang-Mills theory, the modified formula is equivalent to the conventional formula but not identical to it:Both of the definitions give rise to non-local theory in general and thus the unitarity is not obvious. Implications of the present analysis on the lattice regularization are briefly discussed.