Exact Numerical Solution of a Three-Body Ground-State Problem
- 1 March 1962
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review B
- Vol. 125 (5) , 1754-1758
- https://doi.org/10.1103/physrev.125.1754
Abstract
The appropriate Schrödinger equation is solved numerically to give the wave function for the ground-state problem. An ordinary, Gaussian, two-body force without a hard core is used. We outline how our method can be applied (including the Pauli exclusion principle) to the zero-energy scattering problem.
Keywords
This publication has 7 references indexed in Scilit:
- An implicit, numerical method for solving the two-dimensional heat equationQuarterly of Applied Mathematics, 1960
- An implicit, numerical method for solving the 𝑛-dimensional heat equationQuarterly of Applied Mathematics, 1960
- Note on the solution of the neutron diffusion problem by an implicit numerical methodQuarterly of Applied Mathematics, 1959
- Elastic Scattering of Protons and Neutrons by DeuteronsPhysical Review B, 1953
- A Numerical Variational MethodPhysical Review B, 1952
- Neutron-Deuteron Scattering AmplitudesPhysical Review B, 1951
- On the Interpretation of Neutron-Proton Scattering Data by the Schwinger Variational MethodPhysical Review B, 1949