Spectral invariants for finite dimensional Lie algebras

Abstract

For a Lie algebra L with basis \x1,x2,·s,xn\, its associated characteristic polynomial Q L(z) is the determinant of the linear pencil z0I+z1ad x1+·s +znad xn. This paper shows that Q L is invariant under the automorphism group Aut( L). The zero variety and factorization of Q L reflect the structure of L. In the case L is solvable Q L is known to be a product of linear factors. This fact gives rise to the definition of spectral matrix and the Poincar\'e polynomial for solvable Lie algebras. Application is given to 1-dimensional extensions of nilpotent Lie algebras.