On a rationality problem for fields of cross-ratios

Abstract

Let k be a field, n ≥slant 5 be an integer, x1, …, xn be independent variables and Ln = k(x1, …, xn). The symmetric group Sn acts on Ln by permuting the variables, and the projective linear group PGL2 acts by applying (the same) fractional linear transformation to each varaible. The fixed field Ln PGL2 is called "the field of cross-ratios". Let S ⊂ Sn be a subgroup. The Noether Problem asks whether the field extension LnS/k is rational, and the Noether Problem for cross-ratios asks whether KnS/k is rational. In an effort to relate these two problems, H. Tsunogai posed the following question: Is LnS rational over KnS? He answered this question in several situations, in particular, in the case where S = Sn. In this paper we extend his results by recasting the problem in terms of Galois cohomology. Our main theorem asserts that the following conditions on a subgroup S ⊂ Sn are equivalent: (a) LnS is rational over KnS, (b) LnS is unirational over KnS, (c) S has an orbit of odd order in \1, …, n \.