Cohomological construction of relative twists
Abstract
Let g be a complex, semi-simple Lie algebra, h a Cartan subalgebra of g and D a subdiagram of the Dynkin diagram of g. Let gD and lD be the corresponding semi-simple and Levi subalgebras and consider two invariant solutions Phi, PhiD of the pentagon equation for g and gD respectively. Motivated by the theory of quasi-Coxeter quasitriangular quasibialgebras TL3, we study in this paper the existence of a relative twist, that is an element F invariant under lD such that the twist of Phi by F is PhiD. Adapting the method of Donin and Shnider, who treated the case of an empty D, so that lD=h and PhiD=1, we give a cohomological construction of such an F under the assumption that PhiD is the image of Phi under the generalised Harish-Chandra homomorphism. We also show that F is unique up to a gauge transformation if lD is of corank 1 or F satisfies F= F21 where is an involution of g acting as -1 on h.
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