FINITE-ELEMENT BASIS FOR THE EXPANSION OF RADIAL WAVE-FUNCTION IN QUANTUM SCATTERING CALCULATIONS
Radial wavefunctions in quantum scattering calculations are expanded in terms of two shape functions for each finite element. This approach is the R matrix version of Kohn's variational method and also directly applicable to S matrix in the log-derivative version. The linear algebra involved amounts to solving definite banded systems. In this basis set method, R matrix or log-derivative matrix is greatly simplified and the computational effort is linearly proportional to the number of radial basis functions, promising computational efficiencies for large scale calculations. Convergences for test vases are also reasonably rapid.
- Publisher
- ELSEVIER SCIENCE BV
- Issue Date
- 1991-11
- Language
- English
- Article Type
- Article
- Keywords
KOHN VARIATIONAL PRINCIPLE; ELECTRON-MOLECULE COLLISIONS; LOG DERIVATIVE VERSION; REACTIVE SCATTERING
- Citation
CHEMICAL PHYSICS LETTERS, v.187, no.1-2, pp.180 - 186
- ISSN
- 0009-2614
- Appears in Collection
- CH-Journal Papers(저널논문)
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