On centerless unimodular contact Lie algebras

Abstract

We provide an elementary proof that, in a (transversely) unimodular contact Lie algebra, the adjoint action of the Reeb vector is nilpotent except when the Lie algebra is isomorphic to either sl(2,R) or su(2). We introduce a class of contact Lie algebras, called DS-contact Lie algebras, containing all K-contact Lie algebras, and deduce from the previous result that the only centerless unimodular examples in this class are precisely sl(2,R) and su(2). This gives an alternative proof of the previously known fact that centerless unimodular Sasakian Lie algebras are isomorphic to either sl(2,R) or su(2). Some other results known to hold for Sasakian Lie algebras are generalized as well. We investigate several properties of DS-contact Lie algebras in relation to Frobenius Lie algebras, and also classify them in dimension five. Some implications for the contact Lefschetz condition are explored.