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Acceleration of self‐consistent field convergence in ab initio molecular dynamics simulation with multiconfigurational wave function
Author(s) -
Okoshi Masaki,
Nakai Hiromi
Publication year - 2014
Publication title -
journal of computational chemistry
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.907
H-Index - 188
eISSN - 1096-987X
pISSN - 0192-8651
DOI - 10.1002/jcc.23617
Subject(s) - atomic orbital , ab initio , wave function , molecular orbital , convergence (economics) , acceleration , robustness (evolution) , molecular dynamics , computer science , physics , quantum mechanics , chemistry , molecule , electron , gene , economics , economic growth , biochemistry
The Lagrange interpolation of molecular orbital (LIMO) method, which reduces the number of self‐consistent field iterations in ab initio molecular dynamics simulations with the Hartree–Fock method and the Kohn–Sham density functional theories, is extended to the theory of multiconfigurational wave functions. We examine two types of treatments for the active orbitals that are partially occupied. The first treatment, as denoted by LIMO(C), is a simple application of the conventional LIMO method to the union of the inactive core and the active orbitals. The second, as denoted by LIMO(S), separately treats the inactive core and the active orbitals. Numerical tests to compare the two treatments clarify that LIMO(S) is superior to LIMO(C). Further applications of LIMO(S) to various systems demonstrate its effectiveness and robustness. © 2014 Wiley Periodicals, Inc.