The rationality problem for forms of $\overline{M_{0, n}}$

Mathieu Florence; Zinovy Reichstein

arXiv:1709.05698·math.AG·December 13, 2017

The rationality problem for forms of $\overline{M_{0, n}}$

Mathieu Florence, Zinovy Reichstein

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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 $\overline{M_{0, 5}}$ of stable curves of genus $0$ with $5$ marked points. Suppose $n \geq 5$ is an integer, and $F$ is an infinite field of characteristic $\neq = 2$ . It is easy to see that every twisted $F$ -form of $\overline{M_{0, n}}$ is unirational over $F$ . We show that (a) if $n$ is odd, then every twisted $F$ -form of $\overline{M_{0, n}}$ is rational over $F$ . (b) If $n$ is even, there exists a field extension $F / k$ and a twisted $F$ -form $X$ of $\overline{M_{0, n}}$ such that $X$ is not retract rational over $F$ .

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