Harper operators, Fermi curves, and Picard-Fuchs equations
arXiv:1207.5197 · doi:10.1007/s11005-013-0676-8
Abstract
This paper is a continuation of the work on the spectral problem of Harper operator using algebraic geometry. We continue to discuss the local monodromy of algebraic Fermi curves based on Picard-Lefschetz formula. The density of states over approximating components of Fermi curves satisfies a Picard-Fuchs equation. By the property of Landen transformation, the density of states has a Lambert series as the quarter period. A $q$-expansion of the energy level can be derived from a mirror map as in the B-model.
v2, 13 pages, minor changes have been made