Categorified Young symmetrizers and stable homology of torus links
Abstract
We show that the triply graded Khovanov-Rozansky homology of the torus link Tn,k stablizes as k ∞. We explicitly compute the stable homology (as a ring), which proves a conjecture of Gorsky-Oblomkov-Rasmussen-Shende. To accomplish this, we construct complexes Pn of Soergel bimodules which categorify the Young symmetrizers corresponding to one-row partitions and show that Pn is a stable limit of Rouquier complexes. A certain derived endomorphism ring of Pn computes the aforementioned stable homology of torus links.
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