D5(1)- Geometric Crystal corresponding to the Dynkin spin node i=5 and its ultra-discretization

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 that for each Dynkin node i ∈ 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. In this paper we construct a positive geometric crystal V(D5(1)) in the level zero fundamental spin D5(1)- module W(5). Then we define explicit 0-action on the level l known D5(1)- perfect crystal B5, l and show that \B5, l\l ≥ 1 is a coherent family of perfect crystals with limit B5, ∞. Finally we show that the ultra-discretization of V(D5(1)) is isomorphic to B5, ∞ as crystals which proves the conjecture in this case.