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research
Tetrahedron Equation and Quantum
R
R
R
Matrices for modular double of
U
q
(
D
n
+
1
(
2
)
)
,
U
q
(
A
2
n
(
2
)
)
U_q(D^{(2)}_{n+1}), U_q(A^{(2)}_{2n})
U
q
(
D
n
+
1
(
2
)
)
,
U
q
(
A
2
n
(
2
)
)
and
U
q
(
C
n
(
1
)
)
U_q(C^{(1)}_{n})
U
q
(
C
n
(
1
)
)
Authors
Atsuo Kuniba
Masato Okado
Sergey Sergeev
Publication date
1 January 2015
Publisher
'Springer Science and Business Media LLC'
Doi
View
on
arXiv
Abstract
We introduce a homomorphism from the quantum affine algebras
U
q
(
D
n
+
1
(
2
)
)
,
U
q
(
A
2
n
(
2
)
)
,
U
q
(
C
n
(
1
)
)
U_q(D^{(2)}_{n+1}), U_q(A^{(2)}_{2n}), U_q(C^{(1)}_{n})
U
q
(
D
n
+
1
(
2
)
)
,
U
q
(
A
2
n
(
2
)
)
,
U
q
(
C
n
(
1
)
)
to the
n
n
n
-fold tensor product of the
q
q
q
-oscillator algebra
A
q
{\mathcal A}_q
A
q
. Their action commute with the solutions of the Yang-Baxter equation obtained by reducing the solutions of the tetrahedron equation associated with the modular and the Fock representations of
A
q
{\mathcal A}_q
A
q
. In the former case, the commutativity is enhanced to the modular double of these quantum affine algebras.Comment: 11 pages, minor correction
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