Invariants of finite groups acting on (free) skew fields

Abstract

Let M be a finitely generated skew field over a ground field k, and let G be a finite group of k-linear automorphisms of M. This paper investigates finite generation of the skew subfield MG of G-invariants in M, and relations between the generators. The first main result shows that MG is finitely generated. Stronger conclusions hold when M is a free skew field, i.e., the universal skew field of fractions of a free algebra. The second main result is the solution of the free Noether problem for non-modular linear group actions: if G acts linearly on the free skew field M on m generators and the characteristic of k does not divide |G|, then MG is the free skew field on |G|(m-1)+1 generators. In contrast, a nonlinear action of Z2 on the free skew field M on two generators is presented such that MZ2 is not a free skew field, resolving the free L\"uroth problem. This action also exposes a non-scalar element of M whose centralizer is not a rational field, refuting a conjecture of P. M. Cohn from 1978.

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