Mathematics – Algebraic Geometry
Scientific paper
1994-03-27
Mathematics
Algebraic Geometry
38 pages, AMS-LaTeX. Abstract of revised version: This is a significanly revised and expanded version of the original paper. S
Scientific paper
In this paper we give an exposition of Dennis Johnson's work on the first homology of the Torelli groups and show how it can be applied, alone and in concert with Saito's theory of Hodge modules, to study the geometry of moduli spaces of curves. For example, we show that the picard groups of moduli spaces of curves with a fixed level structure are finitely generated, classify all "natural" normal functions defined over moduli spaces of curves with a fixed level, and also "compute" the height paring between cycles over moduli spaces of curves which are homologically trivial and disjoint over the generic point. Several new sections have been added. These apply the results on normal functions to prove generalizations of the classical Franchetta conjecture for curves and abelian varieties. In one section, the monodromy group of nth roots of the canonical bundle is computed.
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