Gribov's horizon and the ghost dressing function

Abstract

We study a relation recently derived by K. Kondo at zero momentum between the Zwanziger's horizon function, the ghost dressing function and Kugo's functions u and w. We agree with this result as far as bare quantities are considered. However, assuming the validity of the horizon gap equation, we argue that the solution w(0)=0 is not acceptable since it would lead to a vanishing renormalised ghost dressing function. On the contrary, when the cut-off goes to infinity, u(0) ∞, w(0) -∞ such that u(0)+w(0) -1. Furthermore w and u are not multiplicatively renormalisable. Relaxing the gap equation allows w(0)=0 with u(0) -1. In both cases the bare ghost dressing function, F(0,), goes logarithmically to infinity at infinite cut-off. We show that, although the lattice results provide bare results not so different from the F(0,)=3 solution, this is an accident due to the fact that the lattice cut-offs lie in the range 1-3 GeV-1. We show that the renormalised ghost dressing function should be finite and non-zero at zero momentum and can be reliably estimated on the lattice up to powers of the lattice spacing ; from published data on a 804 lattice at β=5.7 we obtain FR(0,μ=1.5 GeV) 2.2.