Cohomological rigidity of solvable Lie algebras of maximal ran

Abstract

We study the second cohomology group with coefficients in the adjoint module for a class of solvable Lie algebras RT that arise as maximal solvable extensions of nilpotent Lie algebras N of maximal rank. Under suitable structural assumptions on the root system determined by the action of a maximal torus T on N, we obtain sufficient conditions for the cohomological rigidity of RT. Conversely, we identify explicit configurations of roots that force the second cohomology group to be non-trivial, thereby producing broad families of solvable Lie algebras that are not cohomologically rigid. Our results extend the classical sufficient conditions of Leger and Luks, and they provide a unified and computationally effective framework for determining the cohomological rigidity of a wide class of solvable Lie algebras, including several known results.