Graded sum formula for A1-Soergel calculus and the nil-blob algebra

Abstract

We study the representation theory of the Soergel calculus algebra Aw := End D(W,S) (w) over C in type A1. We generalize the recent isomorphism between the nil-blob algebra NBn and Aw to deal with the two-parameter blob algebra. Under this generalization, the two parameters correspond to the two simple roots for A1. Using this, together with calculations involving the Jones-Wenzl idempotents for the Temperley-Lieb subalgebra of NBn, we obtain a concrete diagonalization of the matrix of the bilinear form on the cell module w(v) for Aw . The entries of the diagonalized matrices turn out to be products of roots for A1. We use this to study Jantzen type filtrations of w(v) for Aw . We show that at enriched Grothendieck group level the corresponding sum formula has terms w(sα v)[ l(sα v)- l(v)] , where [ · ] denotes grading shift.