A Bogomolov unobstructedness theorem for log-symplectic manifolds in general position

Abstract

We consider compact K\"ahlerian manifolds X of even dimension 4 or more, endowed with a log-symplectic holomorphic Poisson structure which is sufficiently general, in a precise linear sense, with respect to its (normal-crossing) degeneracy divisor D(). We prove that (X, ) has unobsrtuced deformations, that the tangent space to its deformation space can be identified in terms of the mixed Hodge structure on H2 of the open symplectic manifold X D(), and in fact coincides with this H2 provided the Hodge number h2,0X=0, and finally that the degeneracy locus D() deforms locally trivially under deformations of (X, ). It has been pointed out that the general position hypothesis in the original paper is not strong enough and this is corrected in an appended erratum/corrigendum to the revised version.