On the Partial Differential L\"uroth's Theorem

Abstract

We study the L\"uroth problem for partial differential fields. The main result is the following partial differential analog of generalized L\"uroth's theorem: Let F be a differential field of characteristic 0 with m derivation operators, u=u1,…,un a set of differential indeterminates over F. We prove that an intermediate differential field G between F and F u is a simple differential extension of F if and only if the differential dimension polynomial of u over G is of the form ωu/G(t)=nt+m m-t+m-s m for some s∈ N. This result generalizes the classical differential L\"uroth's theorem proved by Ritt and Kolchin in the case m=n=1. We then present an algorithm to decide whether a given finitely generated differential extension field of F contained in F u is a simple extension, and in the affirmative case, to compute a L\"uroth generator. As an application, we solve the proper re-parameterization problem for unirational differential curves.