L\"uroth's theorem for fields of rational functions in infinitely many permuted variables

Abstract

L\"uroth's theorem describes the dominant maps from rational curves over a field. In this note we study those dominant rational maps from cartesian powers X of geometrically irreducible varieties X over a field k for infinite sets that are equivariant with respect to all permutations of the factors X. At least some of such maps arise as compositions h:XfY H Y, where XfY is a dominant k-map and H is a group of birational automorphisms of Y|k, acting diagonally on Y. In characteristic 0, we show that this construction, when properly modified, gives all dominant equivariant maps from X, if X=1. For arbitrary X, the results are only partial. Also, a somewhat similar problem of describing the equivariant integral schemes over X of finite type is touched very briefly.