Re: [Talk] Density Functional Theory

看板EngTalk (全英文聊天)作者uniserv1002 (uniserv)時間15年前 (2010/12/26 15:49)推噓0(0推 0噓 0→)

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Although density functional theory has its conceptual roots in the Thomas-Fermi model, DFT was put on a firm theoretical footing by the two Hohenberg-Kohn theorems. The original H-Ktheorems held only for non-degenerate ground states in the absence of a magnetic field , although they have since been generalized to encompass these. The first H-K theorem demonstrates that the ground state properties of a many-electron system are uniquely determined by an electron density that depends on only 3 spatial coordinates. It lays the groundwork for reducing the many-body problem of N electrons with 3N spatial coordinates to 3 spatial coordinates, through the use of functionals of the electron density. This theorem can be extended to the time-dependent domain to develop time-dependent density functional theory, which can be used to describe excited states. The second H-K theorem defines an energy functional for the system and proves that the correct ground state electron density minimizes this energy functional. Within the framework of Kohn-Sham DFT, the intractable many-body problem of interacting electrons in a static external potential is reduced to a tractable problem of noninteracting electrons moving in an effective potential. The effective potential includes the external potential and the effects of the Coulomb interactions between the electrons, e.g., the exchange and correlation interactions. Modeling the latter two interactions becomes the difficulty within KS DFT. The simplest approximation is the local-density approximation, which is based upon exact exchange energy for a uniform electron gas, which can be obtained from the Thomas-Fermi model, and from fits to the correlation energy for a uniform electron gas. Non- interacting systems are relatively easy to solve as the wavefunction can be represented as a Slater determinant of orbitals. Further, the kinetic energy functional of such a system is known exactly. The exchange-correlation part of the total-energy functional remains unknown and must be approximated. -- ※ 發信站: 批踢踢實業坊(ptt.cc) ◆ From: 114.44.135.152