Twisting the N=2 String
Abstract
The most general homogeneous monodromy conditions in N=2 string theory are classified in terms of the conjugacy classes of the global symmetry group U(1,1) Z2. For classes which generate a discrete subgroup , the corresponding target space backgrounds C1,1/ include half spaces, complex orbifolds and tori. We propose a generalization of the intercept formula to matrix-valued twists, but find massless physical states only for = 1 (untwisted) and = Z2 (\`a la Mathur and Mukhi), as well as for being a parabolic element of U(1,1). In particular, the sixteen Z2-twisted sectors of the N=2 string are investigated, and the corresponding ground states are identified via bosonization and BRST cohomology. We find enough room for an extended multiplet of `spacetime' supersymmetry, with the number of supersymmetries being dependent on global `spacetime' topology. However, world-sheet locality for the chiral vertex operators does not permit interactions among all massless `spacetime' fermions.
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