Renormalizability of leading order covariant chiral nucleon-nucleon interaction

Abstract

In this work, we study the renormalization group invariance (RGI) of the recently proposed covariant power counting (PC) scheme in the case of nucleon-nucleon scattering [Chin.Phys. C42 (2018) 014103] at leading order (LO). We show that unlike the LO Weinberg case, RGI is satisfied in the 3P0 channel, because a term of pp' appears naturally in the covariant PC scheme at LO. Another interesting feature is that the 1S0 and 3P1 channels are correlated. Fixing the two relevant low energy constants by fitting to the 1S0 phase shifts at Tlab.=10 and 25 MeV with a cutoff of 400-650 MeV, the 3P1 phase shifts can be described relatively well. In the limit of → ∞, the 1S0 channel becomes cutoff independent, while RGI is lost in the 3P1 channel, consistent with the Wigner bound and the previous observation that the 3P1 channel better be treated perturbatively. As for the 1P1 and 3S1-3D1 channels, RGI is satisfied, similar to the Weinberg approach.