Self-intersection of the Torelli map

Abstract

The Torelli map t Mctg Ag is far from an immersion for g≥ 3: the self-fiber product of the Torelli map for g≥ 3 has several components with nontrivial intersections. We give a stratification of the self-fiber product for arbitrary genus and describe how components in the fiber product intersect. In genus 4, the Torelli fiber product is nonreduced, which we prove by analyzing the expansion of the period map near a nodal curve. We use the geometry of the Torelli fiber product to: Calculate the class of the pullback to Mct4 of the Torelli cycle t*[Mct4] on A4; Find the class t*[M4] for suitable toroidal compactifications A4; Calculate the class t*t*[Mct5]|M5. In the first appendix, we write down a calculation for finding the Chern classes of Mg,n. In the second, we give a formula for a coefficient occurring in an intersection of excess dimension.