Tensor Product Multiplicities via Upper Cluster Algebras

Abstract

For each valued quiver Q of Dynkin type, we construct a valued ice quiver Q2. Let G be a simple connected Lie group with Dynkin diagram the underlying valued graph of Q. The upper cluster algebra of Q2 is graded by the triple dominant weights (μ,,λ) of G. We prove that when G is simply-laced, the dimension of each graded component counts the tensor multiplicity cμ,λ. We conjecture that this is also true if G is not simply-laced, and sketch a possible approach. Using this construction, we improve Berenstein-Zelevinsky's model, or in some sense generalize Knutson-Tao's hive model in type A.