English

Retract Rational Fields

Algebraic Geometry 2011-10-07 v2 Rings and Algebras

Abstract

Let kk be an infinite field. The notion of retract kk-rationality was introduced by Saltman in the study of Noether's problem and other rationality problems. We will investigate the retract rationality of a field in this paper. Theorem 1. Let kKLk\subset K\subset L be fields. If KK is retract kk-rational and LL is retract KK-rational, then LL is retract kk-rational. Theorem 2. For any finite group GG containing an abelian normal subgroup HH such that G/HG/H is a cyclic group, for any complex representation GGL(V)G \to GL(V), the fixed field C(V)G\bm{C}(V)^G is retract C\bm{C}-rational. Theorem 3. If GG is a finite group, then all the Sylow subgroups of GG are cyclic if and only if Cα(M)G\bm{C}_{\alpha}(M)^G is retract C\bm{C}-rational for all GG-lattices MM, for all short exact sequences α:0C×MαM0\alpha : 0 \to \bm{C}^{\times} \to M_{\alpha} \to M \to 0. Because the unramified Brauer group of a retract C\bm{C}-rational field is trivial, Theorem 2 and Theorem 3 generalize previous results of Bogomolov and Barge respectively (see Theorem \ref{t5.9} and Theorem \ref{t6.1}).

Keywords

Cite

@article{arxiv.0911.2521,
  title  = {Retract Rational Fields},
  author = {Ming-chang Kang},
  journal= {arXiv preprint arXiv:0911.2521},
  year   = {2011}
}

Comments

Several typos in the previous version were corrected

R2 v1 2026-06-21T14:11:02.274Z