Propagators associated to periodic Hamiltonians: an example of the Aharonov-Bohm Hamiltonian with two vortices

Abstract

We consider an invariant quantum Hamiltonian H=-LB+V in the L2 space based on a Riemannian manifold M with a discrete symmetry group . Typically, M is the universal covering space of a multiply connected manifold M and is the fundamental group of M. To any unitary representation of one can relate another operator on M=M/, called H, which formally corresponds to the same differential operator as H but which is determined by quasi-periodic boundary conditions. We give a brief review of the Bloch decomposition of H and of a formula relating the propagators associated to the Hamiltonians H and H. Then we concentrate on the example of the Aharonov-Bohm effect with two vortices. We explain in detail the construction of the propagator in this case and indicate all essential intermediate steps.