The Lie algebra structure of tangent cohomology and deformation theory

In this paper we examine some narrowness conditions for Lie algebras over a field F of characteristic zero. In particular we show that the natural analogs of the main coclass conjectures for p-groups hold in the context of ‫-ގ‬graded Lie algebras L which are generated by their first homogeneous comp

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

Let E denote the natural module for the general linear group GL k n over an infinite field k of non-zero characteristic p. We consider here modules which are direct summands of the dth tensor power E md . The original motivation was to study the free Lie algebra. Let L be the d homogeneous component