Perverse sheaves over real hyperplane arrangements II
Abstract
Let H be an arrangement of hyperplanes in Rn and Perv(Cn,H) be the category of perverse sheaves on Cn smooth with respect to the stratification given by complexified flats of H. We give a description of Perv(Cn,H) in terms of "matrix diagrams", i.e., diagrams formed by vector spaces EAB labelled by pairs A,B of real faces of H (of all dimensions) or, equivalently, by the cells iA+B of a natural cell decomposition of Cn. A matrix diagram is formally similar to a datum describing a constructible (non-perverse) sheaf but with the direction of one half of the arrows reversed.
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