Combined fixed-order and effective-theory approach to $b \bar{b}$ sum rules
arXiv:0707.3688 · doi:10.1016/j.physletb.2007.08.069
Abstract
We combine the fixed-order evaluation of the $b\bar{b}$ sum rules with a non-relativistic effective-theory approach. The combined result for the $n$-th moment includes all terms suppressed with respect to the leading-order result by ${\cal O}(α_s^3)$ and ${\cal O}((α_s \sqrt{n})^l α_s^2)$, counting $α_s \sqrt{n} \sim 1$. When compared to experimental data, the moments thus obtained show a remarkable consistency and allow for an analysis in the whole range $1\le n\lesssim 16$.
16 pages, 7 figures,