This article is cited in
24 papers
Double Affine Hecke Algebras of Rank 1 and the $\mathbb Z_3$-Symmetric Askey–Wilson Relations
Tatsuro Itoa,
Paul Terwilligerb a Division of Mathematical and Physical Sciences, Graduate School of Natural Science and Technology, Kanazawa University, Kakuma-
machi, Kanazawa 920-1192, Japan
b Department of Mathematics, University of Wisconsin, 480 Lincoln Drive, Madison, WI 53706-1388, USA
Abstract:
We consider the double affine Hecke algebra
$H=H(k_0,k_1,k^\vee_0,k^\vee_1;q)$ associated with the root system
$(C^\vee_1,C_1)$. We display three elements
$x$,
$y$,
$z$ in
$H$ that satisfy essentially the
$\mathbb Z_3$-symmetric Askey–Wilson relations. We obtain the relations as follows. We work with an algebra
$\hat H$ that is more general than
$H$, called the universal double affine Hecke algebra of type
$(C_1^\vee,C_1)$. An advantage of
$\hat H$ over
$H$ is that it is parameter free and has a larger automorphism group. We give a surjective algebra homomorphism
$\hat H\to H$. We define some elements
$x$,
$y$,
$z$ in
$\hat H$ that get mapped to their counterparts in
$H$ by this homomorphism. We give an action of Artin's braid group
$B_3$ on
$\hat H$ that acts nicely on the elements
$x$,
$y$,
$z$; one generator sends
$x\mapsto y\mapsto z \mapsto x$ and another generator interchanges
$x$,
$y$. Using the
$B_3$ action we show that the elements
$x$,
$y$,
$z$ in
$\hat H$ satisfy three equations that resemble the
$\mathbb Z_3$-symmetric Askey–Wilson relations. Applying the homomorphism
${\hat H}\to H$ we find that the elements
$x$,
$y$,
$z$ in
$H$ satisfy similar relations.
Keywords:
Askey–Wilson polynomials; Askey–Wilson relations; braid group.
MSC: 33D80;
33D45 Received: January 23, 2010; in final form
August 10, 2010; Published online
August 17, 2010
Language: English
DOI:
10.3842/SIGMA.2010.065