Motzkin Algebras and the An Tensor Categories of Bimodules

Abstract

We discuss the structure of the Motzkin algebra Mk(D) by introducing a sequence of idempotents and the basic construction. We show that k≥ 1Mk(D) admits a factor trace if and only if D∈ \2(π/n)+1|n≥ 3\ [3,∞) and higher commutants of these factors depend on D. Then a family of irreducible bimodules over the factors are constructed. A tensor category with An fusion rule is obtained from these bimodules.