Faces in Crystals of Affine Type A and the Shape of Canonical Basis Elements

Abstract

For a dominant integral weight in a Lie algebra of affine type A and rank e, and an interval I0 in the residue set I, we define the face for the interval I0 to be the subgraph of the block-reduced crystal P() that is generated by fi for i ∈ I0. We show that such a face has an automorphism that preserves defects. For an interval of length 2, we also give a non-recursive construction of the e-regular multipartitions with weights in the face, as well as a formula for the number of e-regular multipartitions at each vertex of the face. For an affine Lie algebra of type A we define and investigate the shape of canonical basis elements, a sequence counting the number of multipartitions with a given coefficient. For finite faces generated by with |I0|=1,2, we give a non-recursive closed formula for the canonical basis elements.