Towards perfect quantum insulation

Abstract

Electric fields, applied to insulators, cause transitions between valence and conduction bands, giving rise to current. Adjustments of the Hamiltonian can perfect the quality of the insulator, shutting down transitions whilst fully preserving the many-particle state, but they are challenging to implement. Instead, adjusted Hamiltonians having desirable features are addressed variationally, via the analysis of a suitable figure of merit. They suppress current-enabling transitions whilst tending to preserve the many-particle state, and hence they yield optimal insulation. Emerging naturally from this approach are two established concepts: transitionless quantum driving [M. V. Berry, J. Phys. A: Math. Theor. 42, 365303 (2009)] and (a modified) localization tensor [R. Resta and S. Sorella, Phys. Rev. Lett. 82, 370-373 (1999)]. The variational approach is illustrated via application to a tight-binding model. In this setting, the optimally adjusted Hamiltonian has a powerful impact on transition suppression and localization-tensor reduction, suggesting strong enhancement of insulation. These features are expected to be more general than the model that displays them.