Monoidal categorification of cluster algebras II
Abstract
We prove that the quantum unipotent coordinate algebra Aq(n(w))\ associated with a symmetric Kac-Moody algebra and its Weyl group element w has a monoidal categorification as a quantum cluster algebra. As an application of our earlier work, we achieve it by showing the existence of a quantum monoidal seed of Aq(n(w)) which admits the first-step mutations in all the directions. As a consequence, we solve the conjecture that any cluster monomial is a member of the upper global basis up to a power of q1/2.
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