Computing fusion products of MV cycles using the Mirkovic-Vybornov isomorphism

Abstract

The fusion of two Mirkovic-Vilonen cycles is a degeneration of their product, defined using the Beilinson-Drinfeld Grassmannian. In this paper, we put in place a conceptually elementary approach to computing this product in type A. We do so by transferring the problem to a fusion of generalized orbital varieties using the Mirkovic-Vybornov isomorphism. As an application, we explicitly compute all cluster exchange relations in the coordinate ring of the upper-triangular subgroup of GL4, confirming that all the cluster variables are contained in the Mirkovic-Vilonen basis.

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