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Improved convergence of self‐consistence procedures in the MC SCF theory
Author(s) -
Kuprievich V. A.,
Shramko O. V.
Publication year - 1975
Publication title -
international journal of quantum chemistry
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.484
H-Index - 105
eISSN - 1097-461X
pISSN - 0020-7608
DOI - 10.1002/qua.560090608
Subject(s) - eigenvalues and eigenvectors , exponential function , mathematics , quadratic growth , hamiltonian (control theory) , convergence (economics) , mathematical analysis , hamiltonian matrix , quadratic equation , matrix (chemical analysis) , matrix exponential , quantum mechanics , computational chemistry , physics , chemistry , geometry , symmetric matrix , mathematical optimization , chromatography , economics , differential equation , economic growth
To obtain optimized orbitals within the MC SCF theory, the energy surface near a chosen point is approximated by a quadratic function of independent matrix elements of a small orthogonal orbital transformation. The method of a second‐order one‐electron Hamiltonian (OEH) is developed on the basis of this approximation. A procedure is proposed to define step coordinates, insuring a rapid descent along an average‐energy surface also in the cases when the matrix of second energy derivatives has eigenvalues negative or close to zero. The results obtained in applying the OEH method for the calculation of ground and triplet states of uracile in the π‐electron approximation are discussed. When a complete matrix of the second energy derivatives is used, the self‐consistence procedure is quadratically convergent. An exponential, yet rapid enough convergence is provided by a simplified computation scheme neglecting cross derivatives.