David B. Mitzi
Journal of Materials Chemistry
The equations of multiple-scattering theory (MST) are solved for the case of a lattice of square-well potentials in the shape of squares that fill the plane. We find that multiple-scattering theory is exact within reasonably achievable numerical accuracy. There is a problem with the convergence of MST in its traditional formulation that has obscured the fact that it is an exact theory even for non-muffin-tin, space-filling potentials. We show that this problem can be easily circumvented and describe a rapidly convergent, exact formulation of MST. © 1990 The American Physical Society.
David B. Mitzi
Journal of Materials Chemistry
K.A. Chao
Physical Review B
Revanth Kodoru, Atanu Saha, et al.
arXiv
U. Wieser, U. Kunze, et al.
Physica E: Low-Dimensional Systems and Nanostructures