The idempotents of the TLn-modules nC2 in terms of elements of Uqsl2

Abstract

The vector space nC2 upon which the XXZ Hamilonian with n spins acts bears the structure of a module over both the Temperley-Lieb algebra TLn(β=q+1/q) and the quantum algebra Uqsl2. The decomposition of nC2 as a Uqsl2-module was first described by Rosso [23], Lusztig [15] and Pasquier and Saleur [20] and that as a TLn-module by Martin [17] (see also Read and Saleur [21] and Gainutdinov and Vasseur [9]). For q generic, i.e. not a root of unity, the TLn-module nC2 is known to be a sum of irreducible modules. We construct the projectors (idempotents of the algebra of endomorphisms of nC2) onto each of these irreducible modules as linear combinations of elements of Uqsl2. When q=qc is a root of unity, the TLn-module nC2 (with n large enough) can be written as a direct sum of indecomposable modules that are not all irreducible. We also give the idempotents projecting onto these indecomposable modules. Their expression now involve some new generators, whose action on nC2 is that of the divided powers (S)(r)=q qc (S)r/[r]!.