Hall algebras and quantum groups associated to Dynkin quivers
Abstract
For Dynkin quivers, we find the Laurent polynomials Xa, cb(v) and use Xa, cb(v) to construct the Hall algebra v(()) over [v, v-1], where Xa, cb(|q|)'s are structure constants used by Bridgeland. The Laurent polynomials Xa, cb(v) are explicitly given in A1 case. As an application, we obtain the full quantum groups Ut() associated to the Dynkin quivers for arbitrary t=0,1.
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