Unipotent Elements and Twisting in Link Homology

Abstract

Let U be the unipotent variety of a complex reductive group G. Fix opposed Borel subgroups B ⊂eq G with unipotent radicals U. The map that sends x+x- x+x-x+-1 for all x ∈ U restricts to a map from U+U- gB+ into U gB+, for any g. We conjecture that the restricted map forms half of a homotopy equivalence between these varieties, and thus, induces a weight-preserving isomorphism between their compactly-supported cohomologies. Noting that the map is equivariant with respect to certain actions of B+ gB+g-1, we prove for type A that an equivariant analogue of this isomorphism exists. Curiously, this follows from a certain duality in Khovanov-Rozansky homology, a tool from knot theory.