Revisiting modular symmetry in magnetized torus and orbifold compactifications

Abstract

We study the modular symmetry in T2 and orbifold comfactifications with magnetic fluxes. There are |M| zero-modes on T2 with the magnetic flux M. Their wavefunctions as well as massive modes behave as modular forms of weight 1/2 and represent the double covering group of SL(2,Z), SL(2,Z). Each wavefunction on T2 with the magnetic flux M transforms under (2|M|), which is the normal subgroup of SL(2,Z). Then, |M| zero-modes are representations of the quotient group '2|M| /(2|M|). We also study the modular symmetry on twisted and shifted orbifolds T2/ZN. Wavefunctions are decomposed into smaller representations by eigenvalues of twist and shift. They provide us with reduction of reducible representations on T2.