Different Methods for the Two-Nucleon T-Matrix in the Operator Form
Abstract
We compare three methods to calculate the nucleon-nucleon t-matrix based on the three-dimensional formulation of J. Golak et al., Phys. Rev. C 81, 034006, (2010). In the first place we solve a system of complex linear inhomogeneous equations directly for the t-matrix. Our second method is based on iterations and a variant of the Lanczos algorithm. In the third case we obtain the t-matrix in two steps, solving a system of real linear equations for the k-matrix expansion coefficients and then solving an on-shell equation, which connects the scalar coefficients of the k- and t-matrices. A very good agreement among the three methods is demonstrated for selected nucleon-nucleon scattering observables using a chiral next-to-next-to-leading-order neutron-proton potential. We also apply our three-dimensional framework to the demanding problem of proton-proton scattering, using a corresponding version of the nucleon-nucleon potential and supplementing it with the (screened) Coulomb force, taken also in the three-dimensional form. We show converged results for two different screening functions and find a very good agreement with other methods dealing with proton-proton scattering.
Cite
@article{arxiv.1206.3155,
title = {Different Methods for the Two-Nucleon T-Matrix in the Operator Form},
author = {J. Golak and R. Skibinski and H. Witala and K. Topolnicki and W. Gloeckle and A. Nogga and H. Kamada},
journal= {arXiv preprint arXiv:1206.3155},
year = {2015}
}
Comments
18 pages, 10 figures (54 eps files)