Quivers with quantum Yang-Baxter equation and Hecke condition: Deformation of face algebras
Abstract
In this paper we initiate the study of quivers carrying quantum Yang--Baxter and Hecke structure, and we apply this framework to study path algebras over quivers whose loop spaces carry RTT relations determined by Hecke R-matrices. We show that the quantum matrix algebra Oq(Mn) is isomorphic as a bialgebra to the face algebra over a rose quiver deformed by RTT relations of the GLq(n) Hecke R-matrix.
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