Inert sets and the Lie algebra associated to a group

According to Ado and Cm'tan Theorems, every Lie algebra of finite dimension can be represented as a Lie subalgebra of the Lie algebra associated with the general linear group of matrices. We show in this paper a method to obtain the simply connected Lie group associated with a nilpotent Lie algebra,

The graded Lie algebra L associated to the Nottingham group is a loop algebra ôf the Witt algebra W . The universal covering W of W has one-dimensional 1 1 1 ĉentre, so that the corresponding loop algebra M of W has an infinite-dimen-1 Ž . Ž . sional centre Z M . As MrZ M is isomorphic to L, it foll

Novikov algebras were introduced in connection with the Poisson brackets of hydrodynamic type and Hamiltonian operators in the formal variational calculus. The commutator of a Novikov algebra is a Lie algebra in which there exists a special affine structure (connection with zero curvature and torsio

We define a group theoretical invariant, denoted by s G , as a solution of a certain set covering problem and show that it is closely related to chl(G), the cohomology length of a p-group G. By studying s G we improve the known upper bounds for the cohomology length of a p-group and determine chl(G)