Reconstructing curves from their Hodge classes

Abstract

Let S be a smooth algebraic surface in P3(C). A curve C in S has a cohomology class ηC ∈ H1 -3pt( 1S ). Define α(C) to be the equivalence class of ηC in the quotient of H1 -3pt( 1S ) modulo the subspace generated by the class ηH of a plane section of S. In the paper "Reconstructing subvarieties from their periods" the authors Movasati and Sert\"oz pose several interesting questions about the reconstruction of C from the annihilator Iα(C) of α(C) in the polynomial ring R=H0*(OP3). It contains the homogeneous ideal of C, but is much larger as R/Iα(C) is artinian. We give sharp numerical conditions that guarantee C is reconstructed by forms of low degree in Iα(C). We also show it is not always the case that the class α(C) is perfect, that is, that Iα(C) could be bigger than the sum of the Jacobian ideal of S and of the homogeneous ideals of curves D in S for which Iα(D)=Iα(C).