Toroidal actions on level 1 modules of U_q(\hat{sl_n})
Abstract
Recently Varagnolo and Vasserot established that the q-deformed Fock spaces due to Hayashi, and Kashiwara, Miwa and Stern, admit actions of the quantum toroidal algebra
U
q
(s
l
n
,tor)
(n > 2) with the level (0,1). In the present article we propose a more detailed proof of this fact then the one given by Varagnolo and Vasserot. The proof is based on certain non-trivial properties of Cherednik's commuting difference operators. The quantum toroidal action on the Fock space depends on a certain parameter. We find that with a specific choice of this parameter the action on the Fock spaces gives rise to the toroidal action on irreducible level-1 highest weight modules of the affine quantum algebra
U
q
(
sl
^
n
)
. Similarly, by a specific choice of the parameter, the level (1,0) vertex representation of the quantum toroidal algebra gives rise to a
U
q
(s
l
n
,tor)
-module structure on irreducible level-1 highest weight
U
q
(
sl
^
n
)
-modules.