Young walls and graded dimension formulas for finite quiver Hecke algebras of type A(2)2 and D(2)+1

Abstract

We study graded dimension formulas for finite quiver Hecke algebras R0(β) of type A(2)2 and D(2)+1 using combinatorics of Young walls. We introduce the notion of standard tableaux for proper Young walls and show that the standard tableaux form a graded poset with lattice structure. We next investigate Laurent polynomials associated with proper Young walls and their standard tableaux arising from the Fock space representations consisting of proper Young walls. Then we prove the graded dimension formulas described in terms of the Laurent polynomials. When evaluating at q=1, the graded dimension formulas recover the dimension formulas for R0(β) described in terms of standard tableaux of strict partitions.