Cluster realisations of groups of type AI
Abstract
The group Un of type AIn is a coideal subalgebra of the quantum group Uq(sln+1), associated with the symmetric pair (sln+1,son+1). In this paper, we give a cluster realisation of the algebra Un. Under such a realisation, we give cluster interpretations of some fundamental constructions of Un, including braid group symmetries, the coideal structure, and the action of a Coxeter element. Along the way, we study a (rescaled) integral form of Un, which is compatible with our cluster realisation. We show that this integral form is invariant under braid group symmetries, and construct PBW-bases for the integral form.
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