Let (W, S) be an affine Coxeter system of type Γ, with Γ equal to D or B, and TL(Γ) the corresponding generalized Temperley–Lieb algebra. In this paper we define an infinite dimensional associative algebra made of decorated diagrams that is isomorphic to TL(Γ). Moreover, we describe an explicit basis for such an algebra consisting of special decorated diagrams that we call admissible. Such basis is in bijective correspondence with the classical monomial basis of the generalized Temperley–Lieb algebra indexed by the fully commutative elements of W .
Biagioli, R., Fatabbi, G., Sasso, E. (2025). Diagrammatic Representations of Generalized Temperley–Lieb Algebras of Affine Types $\widetilde{D}$ and $\widetilde{B}$. TAIWANESE JOURNAL OF MATHEMATICS, 29(4), 635-685 [10.11650/tjm/250403].
Diagrammatic Representations of Generalized Temperley–Lieb Algebras of Affine Types $\widetilde{D}$ and $\widetilde{B}$
Biagioli, Riccardo
;Sasso, Elisa
2025
Abstract
Let (W, S) be an affine Coxeter system of type Γ, with Γ equal to D or B, and TL(Γ) the corresponding generalized Temperley–Lieb algebra. In this paper we define an infinite dimensional associative algebra made of decorated diagrams that is isomorphic to TL(Γ). Moreover, we describe an explicit basis for such an algebra consisting of special decorated diagrams that we call admissible. Such basis is in bijective correspondence with the classical monomial basis of the generalized Temperley–Lieb algebra indexed by the fully commutative elements of W .| File | Dimensione | Formato | |
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