The Torelli problem for Logarithmic bundles of hypersurface arrangements in the projective space

Abstract

Let D = \D1, …, D\ be an arrangement of smooth hypersurfaces with normal crossings on the complex projective space Pn and let 1Pn(log D) be the logarithmic bundle attached to it. Our aim is to study the injectivity of the correspondence D 1Pn(log D) . In order to do that, we first show that 1Pn(log D) admits a resolution of length 1 depending on the degrees and on the equations of D1, …, D . Then, we prove a Torelli type theorem when D has a sufficiently large number of components of the same degree d , by recovering them as unstable smooth irreducible degree-d hypersurfaces of 1Pn(log D) . The cases of one quadric and a pair of quadrics in Pn are not Torelli; in particular, through a duality argument, we prove that the isomorphism class of the logarithmic bundle attached to a pair of quadrics is determined by the tangent hyperplanes to the pair. Finally, by describing the moduli spaces containing 1P2(log D) , we show that some line-conic arrangements are not of Torelli type.