Products of Kirillov-Reshetikhin modules and maximal green sequences
Abstract
We show that a q-character of a Kirillov-Reshetikhin module (KR modules) for untwisted quantum affine algebras of simply laced types An(1), Dn(1), E6(1), E7(1), E8(1) might be obtained from a specific cluster variable of a seed obtained by applying a maximal green sequence to the initial (infinite) quiver of the Hernandez-Leclerc cluster algebra. For a collection of KR-modules with nested supports, we show an explicit construction of a cluster seed, which has cluster variables corresponding to the q-characters of KR-modules of such a collection. We prove that the product of KR-modules of such a collection is a simple module. We also construct cluster seeds with cluster variables corresponding to q-characters of KR-modules of some non-nested collections. We make a conjecture that tensor products of KR-modules for such non-nested collections are simple. We show that the cluster Donaldson-Thomas transformations for double Bruhat cells for ADE types can be computed using q-characters of KR-modules.
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