On a rationality problem for fields of cross-ratios II

Abstract

Let k be a field, x1, …, xn be independent variables and Ln = k(x1, …, xn). The symmetric group n acts on Ln by permuting the variables, and the projective linear group PGL2 acts by \[ pmatrix a & b \\ c & d pmatrix xi a xi + bc xi + d \] for each i = 1, …, n. The fixed field LnPGL2 is called "the field of cross-ratios". Given a subgroup S ⊂ n, H. Tsunogai asked whether LnS rational over KnS. When n ≥slant 5 the second author has shown that LnS is rational over KnS if and only if S has an orbit of odd order in \ 1, …, n \. In this paper we answer Tsunogai's question for n ≤slant 4.