Abstract
A method of constructing n 2 × n 2 matrix realization of Temperley–Lieb algebras is presented. The single loop of these realizations are $${d=\sqrt{n}}$$ . In particular, a 9 × 9-matrix realization with single loop $${d=\sqrt{3}}$$ is discussed. A unitary Yang–Baxter $${\breve{R}\theta,q_{1},q_{2})}$$ matrix is obtained via the Yang-Baxterization process. The entanglement properties and geometric properties (i.e., Berry Phase) of this Yang–Baxter system are explored.
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