Invariants of wreath products and subgroups of S6

Abstract

Let G be a subgroup of S6, the symmetric group of degree 6. For any field k, G acts naturally on the rational function field k(x1,...,x6) via k-automorphisms defined by σ· xi=xσ(i) for any σ∈ G, any 1 i 6. Theorem. The fixed field k(x1,...,x6)G is rational (=purely transcendental) over k, except possibly when G is isomorphic to PSL2(F5), PGL2(F5) or A6. When G is isomorphic to PSL2(F5) or PGL2(F5), then C(x1,...,x6)G is C-rational and k(x1,...,x6)G is stably k-rational for any field k. The invariant theory of wreath products will be investigated also.