On the homological description of the Jacobson radical for Lie algebras (Q2857798)

The Jacobson radical \(J(L)\) of a Lie algebra \(L\) is an intersection of all maximal ideals of \(L\). Let \(L\) be a Lie algebra and \(U\) its universal envelope. It is shown that \(L\cap U\) is equal to an intersection of annihilators of all irreducible \(L\)-modules. An \(L\)-module \(M\) is a PI-module if the image of \(L\) in the endomorphism ring of the vector space \(M\) generates an associative PI-algebra. Suppose that the basic field has characterstic zero. If \(L\) has finite dimension then the intersection of annihilators of all irreducible PI-modules coincides with nilpotent radical of \(L\). For any Lie algebra \(L\) intersection of annihilators of all irreducible \(L\)-modules is properly contained in the intersection of annihilators of all irreducible PI-modules ant it is properly contained in the intersection annihilators of all irreducible finite dimensional PI-modules.