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Axial gaussian-lobe orbitals: Optimization of highly angularly dependent functions

✍ Scribed by H. Le Rouzo

Publisher: John Wiley and Sons
Year: 1981
Tongue: English
Weight: 697 KB
Volume: 19
Category: Article
ISSN: 0020-7608
DOI: 10.1002/qua.560190103

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✦ Synopsis

Abstract

Highly angularly dependent axial Gaussian‐lobe orbitals (AGLO) (up to L = 5) are presented. The angular and radial optimizations of these functions have been realized on the ground of theoretical frameworks, previously reported in the literature and somewhat extended here. The numerical difficulties that can appear in the recombination of elementary integrals over lobes are particularly investigated. It is shown that it is necessary to limit the angular accuracy, i.e., the relevant Y~Lo~ character, in order to preserve the accuracy of atomic integrals. The proposed p, d, f, g, and h AGLOS satisfy this condition, and can be used with confidence in LCAO–MO–SCF calculations. Their advantages, e.g., for the treatment of large symmetrical inorganic systems containing transition metal atoms, are emphasized.

📜 SIMILAR VOLUMES

Angular dependence of Gaussian-Lobe orbi

Angular dependence of Gaussian-Lobe orbitals. II. Set of axial Gaussian-Lobe orbitals

✍ H. Le Rouzo; B. Silvi 📂 Article 📅 1978 🏛 John Wiley and Sons 🌐 English ⚖ 642 KB

## Abstract The topological properties of real spherical harmonic representations on the unit sphere have been found to provide a convenient tool to infer the lobe edifices which mimic these orbitals. The prohibitive number of lobes required in such an approach for __l__ > 2, can be avoided in usin