Noetherianity of polynomial rings up to group actions
Abstract
Let k be a commutative Noetherian ring, and k[S] the polynomial ring whose indeterminates are parameterized by elements in a set S. We show that k[S] is Noetherian up to highly homogenous actions of groups. In particular, there is a special linear order ≤slant on infinite S such that k[S] is Noetherian up to actions of Aut(S, ≤slant), and the existence of such a linear order for every infinite set is equivalent to the axiom of choice. These Noetherian results are proved via a sheaf theoretic approach based on Artin's theorem, the work of Nagel-R\"omer, and a classification of highly homogenous groups by Cameron.
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