Orbifold Cohomology of ADE-singularities
Abstract
We study Ruan's "cohomological crepant resolution conjecture" (see math.AG/0108195) for orbifolds with transversal ADE singularities. Let [Y] be such an orbifold, Y its coarse moduli space and Z the crepant resolution of Y. Following Ruan [math.AG/0108195], we have a deformation of the cohomology ring H*(Z) using some Gromov-Witten invariants of Z. The resulting family of rings will be denoted by H*(Z)(q1,...,qn), where q1,...,qn are complex parameters. In the An case we compute both the orbifold cohomology ring H*orb([Y]) and the family H*(Z)(q1,...,qn). The former is achieved in general, the later up to an explicit conjecture on the Gromov-Witten invariants which is verified under additional, technical assumptions. We construct an explicit isomorphism between H*orb([Y]) and H*(Z)(-1) in the A1 case, verifying Ruan's conjecture. In the A2 case, the family H*(q1,q2) is not defined for q1=q2=-1, so the conjecture should be slightly modified. However we give an explicit isomorphism between H*orb([Y]) and H*(Z)(q1,q2) with q1=q2 be a primitive third root of the unity, thus proving a slightly modified version of Ruan's conjecture. It is natural to conjecture that, in the An case, H*orb([Y]) is isomorphic to H*(Z)(q1,...,qn) with q1=...=qn be a primitive (n+1)-th root of the unity.
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