Left-hand cut and the HAL QCD method

Abstract

We investigate how the left-hand cut (LHC) problem is treated in the HAL QCD method. For this purpose, we first consider the effect of the LHC to the scattering problem in non-relativistic quantum mechanics with potentials. We show that the S-matrix or the scattering phase shift obtained from the potential including the Yukawa term (e- mπ r/r) with the infra-red (IR) cutoff R is well-defined even for the complex momentum k as long as R is finite, and they are compared with those obtained by the analytic continuation without the IR cutoff. In the R∞ limit, the phase shift approaches the result from the analytic continuation at Im\, k < mπ/2, while they differ at Im\, k > mπ/2, except k= kb, where kb is the binding momentum. We also observe that kb can be correctly obtained even at finite but large R. Using knowledge obtained in the non-relativistic quantum mechanics, we present how we should treat the LHC in the HAL QCD potential method.