Galois groups and group actions on Lie algebras

Abstract

If g ⊂eq h is an extension of Lie algebras over a field k such that dimk (g) = n and dimk (h) = n + m, then the Galois group Gal \, (h/g) is explicitly described as a subgroup of the canonical semidirect product of groups GL (m, \, k) Mn× m (k). An Artin type theorem for Lie algebras is proved: if a group G whose order isinvertible in k acts as automorphisms on a Lie algebra h, then h is isomorphic to a skew crossed product hG \, \# \, V, where hG is the subalgebra of invariants and V is the kernel of the Reynolds operator. The Galois group Gal \,(h/hG) is also computed, highlighting the difference from the classical Galois theory of fields where the corresponding group is G. The counterpart for Lie algebras of Hilbert's Theorem 90 is proved and based on it the structure of Lie algebras h having a certain type of action of a finite cyclic group is described. Radical extensions of finite dimensional Lie algebras are introduced and it is shown that their Galois group is solvable. Several applications and examples are provided.