Drude and Superconducting Weights and Mott Transitions in Variation Theory

Abstract

Drude weight (D) is a useful measure to distinguish a metal from an insulator. However, D has not been justifiably estimated by the variation theory for long, since Millis and Coppersmith [Phys. Rev. B 43 (1991) 13770] pointed out that a variational wave function Q, which includes the key ingredient (doublon-holon binding effect) for a Mott transition, yields a positive D (namely metallic) even in the Mott-insulating regime. We argue that, to obtain a correct D, an imaginary part must exist in the wave function. By introducing a configuration-dependent phase factor Pθ to Q, Mott transitions are successfully represented by D (D=0 for U>U c) for a normal and d-wave pairing states; thereby, the problem of Millis and Coppersmith is settled. Generally, Pθ plays a pivotal role in describing current-carrying states in regimes of Mott physics. On the other hand, we show using a perturbation theory, the one-body (mean-field) part of the wave function should be complex for band insulators such as antiferromagnetic states in hypercubic lattices.