It is shown by means of an example that a multiple-scattering series for neutron-deuteron scattering, based on the Alt-Grassberger-Sandhas version of the Faddeev equations, can be made to converge by subtracting out the deuteron pole in the two-nucleon $T$ matrix. The subtraction is carried out by means of Kowalski's generalized Sasakawa method. The interactions between the nucleons are rank one separable potentials with Gaussian form factors.

NUCLEAR REACTIONS Scattering theory, neutron-deuteron scattering below breakup threshold.

• Received 18 February 1975

DOI:https://doi.org/10.1103/PhysRevC.12.320