Extending Torelli map to toroidal compactifications of Siegel space

Abstract

It has been known since the 1970s that the Torelli map Mg Ag, associating to a smooth curve its jacobian, extends to a regular map from the Deligne-Mumford compactification Mg to the 2nd Voronoi compactification Agvor. We prove that the extended Torelli map to the perfect cone (1st Voronoi) compactification Agperf is also regular, and moreover Agvor and Agperf share a common Zariski open neighborhood of the image of Mg. We also show that the map to the Igusa monoidal transform (central cone compactification) is NOT regular for g9; this disproves a 1973 conjecture of Namikawa.