Monoidal Categories associated with Kac-Moody Open Richardson Varieties in Symmetric Type

Abstract

In the present paper, we study the factorization properties of the generalized minors \( Δ(w≤ kΛ,\, v≤ kΛ), \) introduced by Fomin--Zelevinsky, in the coordinate rings of Kac--Moody open Richardson varieties. By analyzing their simple factors in the monoidal category Cw,v, we connect the cluster algebra structure of these varieties with the categorical framework developed by Kashiwara--Kim--Oh--Park. In particular, we prove that cluster monomials in the coordinate ring of a Kac--Moody open Richardson variety correspond to isomorphism classes of simple modules in Cw,v. As a consequence, we show that the Grothendieck ring K(Cw,v) contains the cluster algebra structure on the coordinate ring constructed by Bao--Ye. In finite type, we further prove that Leclerc's seeds coincide with Ménard's seeds for open Richardson varieties, and that the category Cw,v provides a monoidal categorification of the cluster structure on the open Richardson variety.