Zero-mode counting formula and zeros in orbifold compactifications

Abstract

We thoroughly analyze the number of independent zero modes and their zero points on the toroidal orbifold T2/ZN (N = 2, 3, 4, 6) with magnetic flux background, inspired by the Atiyah-Singer index theorem. We first show a complete list for the number nη of orbifold zero modes belonging to ZN eigenvalue η. Since it turns out that nη quite complicatedly depends on the flux quanta M, the Scherk-Schwarz twist phase (α1, α2), and the ZN eigenvalue η, it seems hard that nη can be universally explained in a simple formula. We, however, succeed in finding a single zero-mode counting formula nη = (M-Vη)/N + 1, where Vη denotes the sum of winding numbers at the fixed points on the orbifold T2/ZN. The formula is shown to hold for any pattern.