Parabolic vector bundles and equivariant vector bundles
Abstract
Given a complex manifold X, a normal crossing divisor D⊂ X whose irreducible components D1,...,Ds are smooth, and a choice of natural numbers r=(r1,...,rs), we construct a manifold X(D,) with an action of a torus and we prove that some full subcategory of the category of -equivariant vector bundles on X(D,r) is equivalent to the category of parabolic vector bundles on (X,D) in which the lengths of the filtrations over each irreducible component of X are given by r. When X is Kaehler, we study the Kaehler cone of X(D,r) and the relation between the corresponding notions of slope-stability.
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