Subalgebra-preserving deformations of the Lie algebras of witt type

Let K be a field, let A be an associative, commutative K-algebra, and let ⌬ be a nonzero K-vector space of commuting K-derivations of A. Then, with a rather natural definition, A m ⌬ s A⌬ becomes a Lie algebra and we obtain necessary K and sufficient conditions here for this Lie algebra to be simple

Let K be a field and let : ⌫ = ⌫ ª K ⅷ be a bicharacter defined on the multiplicative group ⌫. We suppose that A is a ⌫-graded, associative K-algebra that is color commutative with respect to . Furthermore, let ⌬ be a nonzero ⌫-graded, K-vector space of color derivations of A and suppose that ⌬ is a

We classify all the pairs of a commutative associative algebra with an identity element and its finite-dimensional locally finite Abelian derivation subalgebra such that the commutative associative algebra is derivation-simple with respect to the derivation subalgebra over an algebraically closed fi

In a recent paper by Xu, some simple Lie algebras of generalized Cartan type were constructed, using the mixtures of grading operators and down-grading operators. Among them are the simple Lie algebras of generalized Witt type, which are in general nongraded and have no torus. In this paper, some re