Solvable compatible Lie algebras with a given nilradical
Abstract
We extend the classical construction of solvable Lie algebras from a nilradical to compatible Lie algebras. Since the sum of nilpotent ideals may fail to be nilpotent, we replace the usual nilradical by a \emph{special nilradical} that behaves well with the mixed Jacobi identity. We use the maximal tori of diagonal derivations to build solvable extensions. The method is applied to the pairs and , yielding explicit one-dimensional solvable extensions and proving nonexistence of higher-dimensional ones in these cases. We also study filiform compatible Lie algebras. We introduce the model family and show that each is a linear deformation of the model filiform Lie algebra . Finally, we study the existence of solvable extensions of this family, within the framework developed above.
Cite
@article{arxiv.2602.24094,
title = {Solvable compatible Lie algebras with a given nilradical},
author = {A. Fernández Ouaridi and R. M. Navarro and B. A. Omirov and G. O. Solijanova},
journal= {arXiv preprint arXiv:2602.24094},
year = {2026}
}