Polyhedral realizations for crystal bases and Young walls of classical affine types

Abstract

For affine Lie algebra g of type A(1)n-1, B(1)n-1, C(1)n-1, D(1)n-1, A(2)2n-2, A(2)2n-3 or D(2)n, let B(λ) and B(∞) be the crystal bases of integrable highest weight representation V(λ) and negative part Uq-(g) of quantum group Uq(g). We consider the polyhedral realizations of crystal bases, which realize B(λ) and B(∞) as sets of integer points of some polytopes and cones in R∞. It is a natural problem to find explicit forms of the polytopes and cones. In this paper, we introduce pairs of truncated walls, which are defined as modifications of level 2-Young walls and describe inequalities defining the polytopes and cones in terms of level 1-proper Young walls and pairs of truncated walls. As an application, we also give combinatorial descriptions of k*-functions on B(∞) in terms of Young walls and truncated walls.