Period mappings and properties of the augmented Hodge line bundle

Abstract

Let P be the image of a period map. We discuss progress towards a conjectural Hodge theoretic completion P, an analogue of the Satake-Baily-Borel compactification in the classical case. The set P is defined and given the structure of a compact Hausdorff topological space. We conjecture that it admits the structure of a compact complex analytic variety. We verify this conjecture when dim P 2. In general, P admits a finite cover S (also a compact Hausdorff space, and constructed from Stein factorizations of period maps). Assuming that S is a compact complex analytic variety, we show that a lift of the augmented Hodge line bundle extends to an ample line bundle, giving P the structure of a projective normal variety. Our arguments rely on refined positivity properties of Chern forms associated to various Hodge bundles; properties that might be of independent interest.