IVHS of nodal plane curves
Abstract
Let d,n be the Severi variety of irreducible plane curves of degree d 4 having n nodes, with 0 n d-12-1. We prove that for every [ C]∈ d,n, the infinitesimal variation of the Hodge structure of the normalization C of C is maximal as [ C] moves in d,n. As a preliminary result, we also prove that the family of curves of genus g 1 mapping with degree d 2 to a fixed curve Y of genus π has maximal variation if and only if π = 0.
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