Can solvable extensions of a nilpotent subalgebra be useful in the classification of solvable algebras with the given nilradical?

Abstract

We construct all solvable Lie algebras with a specific n-dimensional nilradical nn,3 which contains the previously studied filiform nilpotent algebra nn-2,1 as a subalgebra but not as an ideal. Rather surprisingly it turns out that the classification of such solvable algebras can be reduced to the classification of solvable algebras with the nilradical nn-2,1 together with one additional case. Also the sets of invariants of coadjoint representation of nn,3 and its solvable extensions are deduced from this reduction. In several cases they have polynomial bases, i.e. the invariants of the respective solvable algebra can be chosen to be Casimir invariants in its enveloping algebra.