Geometric Engineering and Almost Mathieu Operator

Abstract

The type IIA string theory on a non-compact Calabi-Yau geometry known as the local P1 × P1 gives rise to five-dimensional N =1 supersymmetric SU(2) gauge theory compactified on a circle, known as geometric engineering. So it is necessary to study the P1 × P1 in details. Since the spectrum of the local P1 × P1 can be written as E=R2(ep+e-p)+ex+e-x, then by the result of almost Mathieu operator, we show that: (1) when R2<1, the spectrum is absolutely continuous which meanings the medium is conductor. (2) when 1 R2<eβ, the spectrum is singular continuous known as quantum Hall effect. (3) when R2>eβ, the spectrum is almost surely pure point and exhibits Anderson localization. In other words, there are two phase transition points which one is R2=1 and the other one is R2=eβ.