An Equisingular Specialisation of the Compactified Jacobian and its applications

Abstract

For any positive integer k, let Xk be a projective irreducible nodal curve with k nodes. We show that the Betti numbers and the mixed Hodge numbers of the compactified Jacobian Jk of an irreducible nodal curve Xk with k nodes are the same as the Betti numbers and the mixed Hodge numbers of J0× Rk, where J0 is the Jacobian of the normalisation of the irreducible nodal curve and R denotes the rational nodal curve with one node. We prove it by constructing a topologically locally trivial family of projective varieties containing Jk and J0× Rk as fibres.