Generalizations of noncommutative Noether's problem

TL;DR

This paper generalizes the noncommutative Noether's problem, extending previous results to broader contexts and exploring its analogue in prime characteristic, with implications for invariant theory and algebraic structures.

Contribution

It extends the main results of prior work to more general versions of the noncommutative Noether's problem and investigates its analogue in prime characteristic.

Findings

Generalized the main result of  for broader noncommutative Noether's problem versions.

Explored the analogue of the problem in prime characteristic.

Contributed to invariant theory and noncommutative algebra understanding.

Abstract

Noether's problem is classical and very important problem in algebra. It is an intrinsically interesting problem in invariant theory, but with far reaching applications in the sutdy of moduli spaces, PI-algebras, and the Inverse problem of Galois theory, among others. To obtain an noncommutative analogue of Noether's problem, one would need a significant skew field that shares a role similar to the field of ratioal functions. Given the importance of the Weyl fields due to Gelfand-Kirillov's Conjecture, in 2006 J. Alev and F. Dumas introduced what is nowdays called the noncommutative Noether's problem. Many papers in recent years \cite{FMO}, \cite{EFOS}, \cite{FS}, \cite{Tikaradze} have been dedicated to the subject. The aim of this article is to generalize the main result of \cite{FS} for more general versions of Noether's problem; and consider its analogue in prime characteristic.