On quasi-Hopf superalgebras (Q5956419)

Let \(H\) be a complex quasi-Hopf superalgebra with a comultiplication \(\Delta\), counit \(\varepsilon\), antipode \(S\) and an invertible homogeneous 3-cocycle \(\Phi\). It is shown that the new comultiplication \(\Delta'=(S\otimes S)T\Delta S^{-1}\) with the graded twist \(T\) can be obtained as \(\Delta'(a)=F^{-1}_D\Delta(a)F_D\) for some Drinfeld graded twist \(F_D\) which is explicitly constructed. If \(H\) is quasi-triangular then the corresponding \(R\)-matrix \(R'\) for \(H\) with the comultiplication \(\Delta'\) has the form \(R'=F_D^TRF_D^{-1}\).