Affine Geometric Crystal of A(1)n and Limit of Kirillov-Reshetikhin Perfect Crystals

Abstract

Let g be an affine Lie algebra with index set I = \0, 1, 2, ·s , n\ and gL be its Langlands dual. It is conjectured by Kashiwara et al.([16]) that for each k ∈ I \0\ the affine Lie algebra g has a positive geometric crystal whose ultra-discretization is isomorphic to the limit of certain coherent family of perfect crystals for gL. Motivated by this conjecture we construct a positive geometric crystal for the affine Lie algebra g= A(1)n for each Dynkin index k∈ I\0\ and show that its ultra-discretization is isomorphic to the limit of a coherent family of perfect crystals for A(1)n given by Okado et al.([29]). In the process we develop and use some lattice-path combinatorics.