The rationality problem for forms of M0, n

Abstract

Let X be a del Pezzo surface of degree 5 defined over a field F. A theorem of Yu. I. Manin and P. Swinnerton-Dyer asserts that every Del Pezzo surface of degree 5 is rational. In this paper we generalize this result as follows. Recall that del Pezzo surfaces of degree 5 over a field F are precisely the twisted F-forms of the moduli space M0, 5 of stable curves of genus 0 with 5 marked points. Suppose n ≥ 5 is an integer, and F is an infinite field of characteristic ≠ 2. It is easy to see that every twisted F-form of M0, n is unirational over F. We show that (a) if n is odd, then every twisted F-form of M0, n is rational over F. (b) If n is even, there exists a field extension F/k and a twisted F-form X of M0, n such that X is not retract rational over F.