Geometric orbital magnetization in adiabatic processes

Abstract

We consider periodic adiabatic processes of gapped many-body spinless electrons. We find an additional contribution to the orbital magnetization due to the adiabatic time evolution, dubbed geometric orbital magnetization, which can be expressed as derivative of the many-body Berry phase with respect to an external magnetic field. For two-dimensional band insulators, we show that the geometric orbital magnetization generally consists of two pieces, the topological piece that is expressed as third Chern-Simons form in (t,kx,ky) space, and the non-topological piece that depends on Bloch states and energies of both occupied and unoccupied bands.