On cluster structures of bosonic extensions

Abstract

We study quantum cluster structures on bosonic extensions of quantum unipotent coordinate rings. For a positive braid group element b∈ Br+, Kashiwara--Kim--Oh--Park introduced a subalgebra A(b) and conjectured that it admits a quantum cluster algebra structure whose cluster monomials belong to the global basis. In this paper, we analyze Lusztig parametrizations of the global basis of A(b) and study their transition maps under braid moves. We prove that the resulting quantum cluster structure is independent of the chosen expression of b. Combining these ingredients, we prove the Kashiwara--Kim--Oh--Park conjecture for every \(b∈Br+\) in type ADE. Our proof is based on the compatibility between Lusztig parametrizations, braid moves, and cluster mutations, and is different from the approaches of Qin and of Kashiwara--Kim--Oh--Park. We also establish quantum \(T\)-system relations for generalized quantum minors and show that these minors occur as cluster variables.