Homological mirror symmetry for An-resolutions as a T-duality
Abstract
We study Homological Mirror Symmetry (HMS) for An-resolutions from the SYZ viewpoint. Let X2/n+1 be the crepant resolution of the An-singularity. The mirror of X is given by a smoothing X of 2/n+1. Using SYZ transformations, we construct a geometric functor from a derived Fukaya category of X to the derived category of coherent sheaves on X. We show that this is an equivalence of triangulated categories onto a full triangulated subcategory of Db(X), thus realizing Kontsevich's HMS conjecture by SYZ.
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