Lefschetz filtration and Perverse filtration on the compactified Jacobian
Abstract
Let C be a complex integral curve with plannar singularities. Let J be the compactified Jacobian of C. There are two filtrations on the cohomology group H*(J). One is obtained by the nilpotent morphism defined by cupping a certain ample divisor on J, which we call the Lefschetz filtration. To obtain the other filtration, we put C into a family of curves C→ B so that J can be embedded into a family f:J→ B, and we let B, C,J be smooth. Then Rf*(QJ) decomposes into a direct sum of its (shifted) perverse cohomologies. Restricting this decomposition to fibers, we get a filtration on H*(J) called the perverse filtration. We show in this paper that these two filtrations are opposite to each other as conjectured by Maulik-Yun.
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