Exceptional collections and D-branes probing toric singularities
Abstract
We demonstrate that a strongly exceptional collection on a singular toric surface can be used to derive the gauge theory on a stack of D3-branes probing the Calabi-Yau singularity caused by the surface shrinking to zero size. A strongly exceptional collection, i.e., an ordered set of sheaves satisfying special mapping properties, gives a convenient basis of D-branes. We find such collections and analyze the gauge theories for weighted projective spaces, and many of the Yp,q and Lp,q,r spaces. In particular, we prove the strong exceptionality for all p in the Yp,p-1 case, and similarly for the Yp,p-2r case.
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