-Lie algebras with an ideal

In this paper we deal with graded Lie algebras L such that there exists a positive integer r such that for every positive integer i and for every homogeneous ideal I L i the inclusion I ⊇ L i+r-1 holds. The solvable case and the r = 1 case receive a special attention.

Let A be a prime algebra of characteristic not 2 with extended centroid C, let R be a noncentral Lie ideal of A and let B be the subalgebra of A generated by R. If f , d : R → A are linear maps satisfying that f ([x, y]) = f (x)yf (y)x + xd(y)yd(x) for all x, y ∈ R, then there exist a generalized de

By analogy with the definition of group with triality we introduce Lie algebra with triality as Lie algebra L which admits the group of automorphisms S 3 = {σ, ρ | σ 2 = ρ 3 = 1, σρσ = ρ 2 } such that for any x ∈ L we have (x σx) + (x σx) ρ + (x σx) ρ 2 = 0. We describe the structure of finite-dimen