Index theorem on T2/ZN orbifolds
Abstract
We investigate chiral zero modes and winding numbers at fixed points on T2/ZN orbifolds. It is shown that the Atiyah-Singer index theorem for the chiral zero modes leads to a formula n+-n-=(-V++V-)/2N, where n are the numbers of the chiral zero modes and V are the sums of the winding numbers at the fixed points on T2/ZN. This formula is complementary to our zero-mode counting formula on the magnetized orbifolds with non-zero flux background M ≠ 0, consistently with substituting M = 0 for the counting formula n+ - n- = (2M - V+ + V-)/2N.
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