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Normalized Leonard pairs and Askey–Wilson relations
Let V denote a vector space with finite positive dimension, and let ( A, A ∗) denote a Leonard pair on V. As is known, the linear transformations A, A ∗ satisfy the Askey–Wilson relations A 2 A ∗ - β AA ∗ A + A ∗ A 2 - γ ( AA ∗ + A ∗ A ) - ϱ A ∗ = γ ∗ A 2 + ω A + η I , A ∗ 2 A - β A ∗ AA ∗ + AA ∗ 2...
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| Published in: | Linear algebra and its applications 2007-04, Vol.422 (1), p.39-57 |
|---|---|
| Main Author: | |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that this one cites Items that cite this one |
| Online Access: | Get full text |
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| Summary: | Let
V denote a vector space with finite positive dimension, and let (
A,
A
∗) denote a Leonard pair on
V. As is known, the linear transformations
A,
A
∗ satisfy the Askey–Wilson relations
A
2
A
∗
-
β
AA
∗
A
+
A
∗
A
2
-
γ
(
AA
∗
+
A
∗
A
)
-
ϱ
A
∗
=
γ
∗
A
2
+
ω
A
+
η
I
,
A
∗
2
A
-
β
A
∗
AA
∗
+
AA
∗
2
-
γ
∗
(
A
∗
A
+
AA
∗
)
-
ϱ
∗
A
=
γ
A
∗
2
+
ω
A
∗
+
η
∗
I
,
for some scalars
β,
γ,
γ
∗,
ϱ,
ϱ
∗,
ω,
η,
η
∗. The scalar sequence is unique if the dimension of
V is at least 4.
If
c,
c
∗,
t,
t
∗ are scalars and
t,
t
∗ are not zero, then (
tA
+
c,
t
∗
A
∗
+
c
∗) is a Leonard pair on
V as well. These affine transformations can be used to bring the Leonard pair or its Askey–Wilson relations into a convenient form. This paper presents convenient normalizations of Leonard pairs by the affine transformations, and exhibits explicit Askey–Wilson relations satisfied by them. |
|---|---|
| ISSN: | 0024-3795 1873-1856 |
| DOI: | 10.1016/j.laa.2005.12.033 |