$O(aα_s)$ matching coefficients for the $ÎB$=2 operators in the lattice static theory
arXiv:hep-lat/9812007 · doi:10.1103/PhysRevD.60.034501
Abstract
We present the perturbative matching coefficient to $O(aα_s)$ which relates the $ÎB$=2 operator in the continuum to that of the lattice static theory, which is important in the accurate extraction of the continuum value of the $B_B$ from lattice simulations. The coefficients are obtained by the one-loop calculations in both of the continuum and lattice theory. We find that two new dimension seven operators appear at the $O(aα_s)$ with the O(1) coefficients. We also discuss the possible cancellation of $O(aα_s)$ correction in the ratio $B_B=<\bar{B}|\Op_L|B>/ ((8/3)(f_{B}M_{B})^2)$ qualitatively.
14 pages, no figures, uses REVTeX; added references, corrected typos