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On a rationality problem for fields of cross-ratios II

Published online by Cambridge University Press:  04 September 2020

Tran-Trung Nghiem
Affiliation:
Département de Mathématiques et Applications, École Normale Supérieure Paris, Paris, Francee-mail:tran-trung.nghiem@ens.fr
Zinovy Reichstein*
Affiliation:
Department of Mathematics, University of British Columbia, Vancouver, BCV6T 1Z2, Canada

Abstract

Let k be a field, $x_1, \dots , x_n$ be independent variables and let $L_n = k(x_1, \dots , x_n)$ . The symmetric group $\operatorname {\Sigma }_n$ acts on $L_n$ by permuting the variables, and the projective linear group $\operatorname {PGL}_2$ acts by

$$ \begin{align*} \begin{pmatrix} a & b \\ c & d \end{pmatrix}\, \colon x_i \longmapsto \frac{a x_i + b}{c x_i + d} \end{align*} $$
for each $i = 1, \dots , n$ . The fixed field $L_n^{\operatorname {PGL}_2}$ is called “the field of cross-ratios”. Given a subgroup $S \subset \operatorname {\Sigma }_n$ , H. Tsunogai asked whether $L_n^S$ rational over $K_n^S$ . When $n \geqslant 5,$ the second author has shown that $L_n^S$ is rational over $K_n^S$ if and only if S has an orbit of odd order in $\{ 1, \dots , n \}$ . In this paper, we answer Tsunogai’s question for $n \leqslant 4$ .

Type
Article
Copyright
© Canadian Mathematical Society 2020

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Footnotes

Tran-Trung Nghiem was supported by a Fondation Hadamard Scholarship. Zinovy Reichstein was partially supported by National Sciences and Engineering Research Council of Canada Discovery grant 253424-2017.

References

Gille, P. and Szamuely, T., Central simple algebras and Galois cohomology. 2nd ed., Cambridge Studies in Advanced Mathematics, 165, Cambridge University Press, Cambridge, 2017.Google Scholar
Groupprops, The Group Properties Wiki, Subgroup structure of symmetric group ${S}_4$ . https://groupprops.subwiki.org/wiki/Subgroup_structure_of_symmetric_group:S4 Google Scholar
Hoshi, A., Kang, M., and Kitayama, H., Quasi-monomial actions and some 4-dimensional rationality problems. J. Algebra 403(2014), 363400. http://dx.doi.org/10.1016/j.jalgebra.2014.01.019 CrossRefGoogle Scholar
Jacobson, N., Basic algebra. II. 2nd ed., W. H. Freeman and Company, New York, 1989.Google Scholar
Kang, M. and Wang, B., Rational invariants for subgroups of ${S}_5$ and ${S}_7$ . J. Algebra 413(2014), 345363. http://dx.doi.org/10.1016/j.jalgebra.2014.05.015 CrossRefGoogle Scholar
Reichstein, Z., On a rationality problem for fields of cross-ratios. Tokyo J. Math. 43(2020), no. 1, 205213. http://dx.doi.org/10.3836/tjm/1502179305 CrossRefGoogle Scholar
Reichstein, Z. and Scavia, F., The Noether problem for spinor groups of small rank. J. Algebra 548(2020), 134152. MR4046156CrossRefGoogle Scholar
Serre, J.-P., Galois cohomology. Translated from the French by Patrick Ion and revised by the author. Springer-Verlag, Berlin, 1997. http://dx.doi.org/10.1007/978-3-642-59141-9 Google Scholar
Tsunogai, H., Toward Noether’s problem for the fields of cross-ratios. Tokyo J. Math. 39(2017), no. 3, 901922. http://dx.doi.org/10.3836/tjm/1491465735 CrossRefGoogle Scholar
van der Waerden, B. L., Algebra. Vol. II. Translated from the 5th German edition by Schulenberger, John R.. Springer-Verlag, New York, 1991.Google Scholar