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Self-consistent field theory ground state solutions

The relativistic theory and computation of atomic structures and processes has therefore attained some sort of maturity and the various codes now available are widely used. Those mentioned so far were based on ideas originating from Hartree and his students [28], and have been developed in much the same way as the non-relativistic self-consistent field theory recorded in [28-30]. All these methods rely on the numerical solution, using finite differences, of the coupled differential equations for radial orbital wave-functions of the self-consistent field. This makes them unsuitable for the study of molecules, for which it is preferable to expand the radial amplitudes in a suitably chosen set of analytic functions. This nonrelativistic matrix Hartree-Fock method, as it is often termed, was pioneered by Hall and Lennard-Jones [31], Hall [32,33] and Roothaan [34,35], and it was Roothaan s students, Synek [36] and Kim [37] who were the first to attempt to solve the corresponding matrix Dirac-Hartree-Fock equations. Kim was able to obtain solutions for the ground state of neon in 1967, but at the expense of some numerical instability, and it seemed at the time that the matrix Dirac-Hartree-Fock scheme would not be a serious competitor to the finite difference codes. [Pg.109]

R. Cammi, L. Frediani, B. Mennucci, K. Ruud, Multiconfigurational self-consistent field linear response for the polarizable continuum model Theory and application to ground and excited-state polarizabilities of para-nitroanUine in solution. J. Chem. Phys. 119, 5818 (2003)... [Pg.35]

The determination of the ground state energy and the ground state electron density distribution of a many-electron system in a fixed external potential is a problem of major importance in chemistry and physics. For a given Hamiltonian and for specified boundary conditions, it is possible in principle to obtain directly numerical solutions of the Schrodinger equation. Even with current generations of computers, this is not feasible in practice for systems of large total number of electrons. Of course, a variety of alternative methods, such as self-consistent mean field theories, also exist. However, these are approximate. [Pg.33]


See other pages where Self-consistent field theory ground state solutions is mentioned: [Pg.402]    [Pg.466]    [Pg.111]    [Pg.364]    [Pg.130]    [Pg.111]    [Pg.137]    [Pg.91]    [Pg.132]    [Pg.91]    [Pg.659]    [Pg.582]    [Pg.185]    [Pg.678]   
See also in sourсe #XX -- [ Pg.183 ]




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Self-Consistent Field

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Self-consistent field theory

Self-consistent theory

Self-consisting fields

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