Exact and approximate relations for the spin-dependence of the exchange energy in high magnetic fields
arXiv:0811.0714 · doi:10.1142/S0217979209062712
Abstract
The exchange energy of an arbitrary collinear-spin many-body system in an external magnetic field is a functional of the spin-resolved charge and current densities, $E_x[n_{\uparrow},n_{\downarrow},j_{\uparrow},j_{\downarrow}]$. Within the framework of density-functional theory (DFT), we show that the dependence of this functional on the four densities can be fully reconstructed from either of two extreme limits: a fully polarized system or a completely unpolarized system. Reconstruction from the limit of an unpolarized system yields a generalization of the Oliver-Perdew spin scaling relations from spin-DFT to current-DFT. Reconstruction from the limit of a fully polarized system is used to derive the high-field form of the local-spin-density approximation to current-DFT and to magnetic-field DFT.
Int. J. Mod Phys. B, accepted, 2008 (Proceedings of the 18th International Conference on High Magnetic Fields in Semiconductor Physics and Nanotechnology). 5 pages