On Cn(1)-Geometric Crystal and its Ultradiscretization

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 a certain coherent family of perfect crystals for the Langland dual gL. In this paper we construct positive geometric crystals for V(Cn(1)) in the level zero fundamental spin Cn(1)- module W(n) for n = 2, 3,4 and show that its ultra-discretization is isomorphic to the limit Bn, ∞ of a coherent family \Bn, l\l ≥ 1 of perfect crystals for the Langland dual Dn(2) which proves the conjecture in these cases.

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