The Hilb-vs-Quot Conjecture

Abstract

Let R be the complete local ring of a complex plane curve germ and S its normalization. We propose a "Hilb-vs-Quot" conjecture relating the virtual weight polynomials of the Hilbert schemes of R to those of the Quot schemes that parametrize R-submodules of S. By relating the Quot side to a type of compactified Picard scheme, we show that our conjecture generalizes a conjecture of Cherednik's, and that it would relate the perverse filtration on the cohomology of the Picard side to a more elementary filtration. Next, we propose a Quot version of the Oblomkov-Rasmussen-Shende conjecture, relating parabolic refinements of our Quot schemes to Khovanov-Rozansky link homology. It becomes equivalent to the original version under (refined) Hilb-vs-Quot, but can also be strengthened to incorporate polynomial actions and y-ification. For germs yn = xd, where n is either coprime to or divides d, we prove the Quot version of ORS through combinatorics. When n = 3 and 3 d, we deduce Hilb-vs-Quot by an asymptotic argument, and hence, establish the original ORS conjecture for these germs.

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