On behavior of solvable ideals of Lie algebras under outer derivations

Abstract

Let L be a finite dimensional Lie algebra over a field F. It is well known that the solvable radical S(L) of the algebra L is a characteristic ideal of L if F=0 and there are counterexamples to this statement in case F=p>0. We prove that the sum S(L) of all solvable ideals of a Lie algebra L (not necessarily finite dimensional) is a characteristic ideal of L in the following cases: 1) F=0; 2) S(L) is solvable and its derived length is less than 2p. Some estimations (in characteristic 0) for the derived length of ideals I+D(I)+... +Dk(I) are obtained where I is a solvable ideal of L and D∈ Der(L).