Integral cluster structures on quantized coordinate rings
Abstract
We develop (quantum) cluster algebra structures over arbitrary commutative unital rings and prove that the (quantized) coordinate rings of connected simply-connected complex simple algebraic groups G over admit such structures. We first show that the integral form of the quantized coordinate ring of G admits an upper quantum cluster algebra structure over A=Z[q12] by using a combination of tools from quantum groups, canonical bases and cluster algebras and a previous result of the second and third authors over Q(q12). We then obtain (integral) quantum versions of recent results of the first author: when G is not of type F4, the quantized coordinate ring of G admits a quantum cluster algebra structure over A', where A'=A when G is not of types G2, E8, and F4; A'=A[(q2+1)-1] when G is of type G2, and A'=Q(q12) when G is of type E8. We furthermore prove that the classical versions of these results hold over A' (where A'=Z if G is not of type F4 or G2 and A'=Z[12] if G is of type G2) and that the integral form of the coordinate ring of G of type F4 is an upper cluster algebra. Finally, by using common triangular bases of (quantum) cluster algebras, we prove that the above results also hold under specializations of A and A' to commutative unital rings .
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