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Free field constructions for the elliptic algebra Aq,p(sl^2){\cal A}_{q,p}(\hat{sl}_2) and Baxter's eight-vertex model

Abstract

Three examples of free field constructions for the vertex operators of the elliptic quantum group Aq,p(sl^2){\cal A}_{q,p}(\hat{sl}_2) are obtained. Two of these (for p1/2=±q3/2,p1/2=−q2p^{1/2}=\pm q^{3/2},p^{1/2}=-q^2) are based on representation theories of the deformed Virasoro algebra, which correspond to the level 4 and level 2 ZZ-algebra of Lepowsky and Wilson. The third one (p1/2=q3p^{1/2}=q^{3}) is constructed over a tensor product of a bosonic and a fermionic Fock spaces. The algebraic structure at p1/2=q3p^{1/2}=q^{3}, however, is not related to the deformed Virasoro algebra. Using these free field constructions, an integral formula for the correlation functions of Baxter's eight-vertex model is obtained. This formula shows different structure compared with the one obtained by Lashkevich and Pugai.Comment: 23 pages. Based on talks given at "MATHPHYS ODYSSEY 2001-Integrable Models and Beyond" at Okayama and Kyoto, February 19-23, 2001, et

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    Last time updated on 02/01/2020