On the rationality problem for forms of moduli spaces of stable marked curves of positive genus

Abstract

Let Mg, n (respectively, Mg, n) be the moduli space of smooth (respectively stable) curves of genus g with n marked points. Over the field of complex numbers, it is a classical problem in algebraic geometry to determine whether or not Mg, n (or equivalently, Mg, n) is a rational variety. Theorems of J. Harris, D. Mumford, D. Eisenbud and G. Farkas assert that Mg, n is not unirational for any n ≥slant 0 if g ≥slant 22. Moreover, P. Belorousski and A. Logan showed that Mg, n is unirational for only finitely many pairs (g, n) with g ≥slant 1. Finding the precise range of pairs (g, n), where Mg, n is rational, stably rational or unirational, is a problem of ongoing interest. In this paper we address the rationality problem for twisted forms of Mg, n defined over an arbitrary field F of characteristic ≠ 2. We show that all F-forms of Mg, n are stably rational for g = 1 and 3 ≤slant n ≤slant 4, g = 2 and 2 ≤slant n ≤slant 3, g = 3 and 1 ≤slant n ≤slant 14, g = 4 and 1 ≤slant n ≤slant 9, g = 5 and 1 ≤slant n ≤slant 12.