Jacobi-Lie T-plurality

Abstract

We propose a Leibniz algebra, to be called DD+, which is a generalization of the Drinfel'd double. We find that there is a one-to-one correspondence between a DD+ and a Jacobi--Lie bialgebra, extending the known correspondence between a Lie bialgebra and a Drinfel'd double. We then construct generalized frame fields EAM∈O(D,D)×R+ satisfying the algebra LEAEB = - XABC\,EC\,, where XABC are the structure constants of the DD+ and L is the generalized Lie derivative in double field theory. Using the generalized frame fields, we propose the Jacobi-Lie T-plurality and show that it is a symmetry of double field theory. We present several examples of the Jacobi-Lie T-plurality with or without Ramond-Ramond fields and the spectator fields.