Cubic Dirac operator for Uq(sl2)

Abstract

We construct the q-deformed Clifford algebra of sl2 and study its properties. This allows us to define the q-deformed noncommutative Weil algebra Wq(sl2) for Uq(sl2) and the corresponding cubic Dirac operator Dq. In the classical case it was done by Alekseev and Meinrenken. We show that the cubic Dirac operator Dq is invariant with respect to the Uq(sl2)-action and *-structures on Wq(sl2), moreover, the square of Dq is central in Wq(sl2). We compute the spectrum of the cubic element on finite-dimensional and Verma modules of~Uq(sl2) and the corresponding Dirac cohomology.