Logarithmic bundles of multi-degree arrangements in Pn

Abstract

Let D = \D1, ..., D\ be a multi-degree arrangement with normal crossings on the complex projective space Pn , with degrees d1, ..., d ; let Pn1( D) be the logarithmic bundle attached to it. First we prove a Torelli type theorem when D has a sufficiently large number of components by recovering them as unstable smooth irreducible degree- di hypersurfaces of Pn1( D) . Then, when n = 2 , by describing the moduli spaces containing P21( D) , we show that arrangements of a line and a conic, or of two lines and a conic, are not Torelli. Moreover we prove that the logarithmic bundle of three lines and a conic is related with the one of a cubic. Finally we analyze the conic-case.