Paths, tableaux, and q-characters of quantum affine algebras: the Cn case
Abstract
For the quantum affine algebra Uq(g) with g of classical type, let λ/μ,a be the Jacobi-Trudi type determinant for the generating series of the (supposed) q-characters of the fundamental representations. We conjecture that λ/μ,a is the q-character of a certain finite dimensional representation of Uq(g). We study the tableaux description of λ/μ,a using the path method due to Gessel-Viennot. It immediately reproduces the tableau rule by Bazhanov-Reshetikhin for An and by Kuniba-Ohta-Suzuki for Bn. For Cn, we derive the explicit tableau rule for skew diagrams λ/μ of three rows and of two columns, and give the implicit tableau rule in terms of paths for general λ/μ.
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