Polyhedral realizations for B(∞) and extended Young diagrams, Young walls of type A(1)n-1, C(1)n-1, A(2)2n-2, D(2)n

Abstract

The crystal bases are quite useful combinatorial tools to study the representations of quantized universal enveloping algebras Uq(g). The polyhedral realization for B(∞) is a combinatorial description of the crystal base, which is defined as an image of embedding :B(∞) Z∞, where is an infinite sequence of indices and Z∞ is an infinite Z-lattice with a crystal structure associated with . It is a natural problem to find an explicit form of the polyhedral realization Im(). In this article, supposing that g is of affine type A(1)n-1, C(1)n-1, A(2)2n-2 or D(2)n and satisfies the condition of `adaptedness', we describe Im() by using several combinatorial objects such as extended Young diagrams and Young walls.

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