The partial Temperley-Lieb algebra and its representations
Abstract
We give a combinatorial description of a new diagram algebra, the partial Temperley--Lieb algebra, arising as the generic centralizer algebra EndUq(gl2)(V k), where V = V(0) V(1) is the direct sum of the trivial and natural module for the quantized enveloping algebra Uq(gl2). It is a proper subalgebra of the Motzkin algebra (the Uq(sl2)-centralizer) of Benkart and Halverson. We prove a version of Schur--Weyl duality for the new algebras, and describe their generic representation theory.
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