Hyperasymptotic approximation to the top, bottom, and charm pole mass
César Ayala, Xabier Lobregat, Antonio Pineda
Abstract
We construct hyperasymptotic expansions for the heavy quark pole mass regulated using the principal value (PV) prescription. We apply such hyperasymptotic expansions to the $B/D$ meson masses, and $\overline{\mathrm{\ensuremath{\Lambda}}}$ computed in the lattice. The issue of the uncertainty of the (top) pole mass is critically reexamined. The present theoretical uncertainty in the relation between ${\overline{m}}_{t}$, the $\overline{\mathrm{MS}}$ top mass, and ${m}_{t,\mathrm{PV}}$, the top pole mass regulated using the PV prescription, is numerically assessed to be $\ensuremath{\delta}{m}_{t,\mathrm{PV}}=28\text{ }\text{ }\mathrm{MeV}$ for ${\overline{m}}_{t}=163\text{ }\text{ }\mathrm{GeV}$.
Topics & Concepts
PhysicsParticle physicsLambdaMesonBar (unit)Charm (quantum number)Nuclear physicsQuantum mechanicsMeteorologyParticle physics theoretical and experimental studiesQuantum Chromodynamics and Particle InteractionsHigh-Energy Particle Collisions Research