cSW at One-Loop Order for Brillouin Fermions

Abstract

Wilson-like Dirac operators can be written in the form D=γμ∇μ- ar2 . For Wilson fermions the standard two-point derivative ∇μ(std) and 9-point Laplacian (std) are used. For Brillouin fermions these are replaced by improved discretizations ∇μ(iso) and (bri) which have 54- and 81-point stencils respectively. We derive the Feynman rules in lattice perturbation theory for the Brillouin action and apply them to the calculation of the improvement coefficient cSW, which, similar to the Wilson case, has a perturbative expansion of the form cSW=1+cSW(1)g02+O(g04). For Nc=3 we find cSW(1)Brillouin =0.12362580(1) , compared to cSW(1)Wilson = 0.26858825(1), both for r=1.