A categorification of the skew Howe action on a representation category of Uq(gl(m|n))

Abstract

Using quantum skew-Howe duality, we study the category Rep(gl(m|n)) of tensor products of exterior powers of the standard representation of Uq(gl(m|n)), and prove that it is equivalent to a category of ladder diagrams modulo one extra family of relations. We then construct a categorification of Rep(gl(m|n)) using the theory of foams. In the case of n=0, we show that we can recover sl(m) foams introduced by Queffelec and Rose to define Khovanov-Rozansky sl(m) link homology. We also define a categorification of the monoidal category of symmetric powers of the standard representation of Uq(gl(n)), since this category can be identified with Rep(gl(0|n)). The relations on our foams are non-local, since the number of dots that can appear on a facet depends on the position of the dot in the foam, rather than just on its colouring. This may be related to Gilmore's non-local relations in Heegaard Floer knot homology.