An analogue of Hilbert's Theorem 90 for infinite symmetric groups (1508.02267v6)

Abstract: Let $K$ be a field and $G$ be a group of its automorphisms. If $G$ is precompact then $K$ is a generator of the category of smooth (i.e. with open stabilizers) $K$-semilinear representations of $G$. There are non-semisimple smooth semilinear representations of $G$ over $K$ if $G$ is not precompact. In this note the smooth semilinear representations of the group $G$ of all permutations of an infinite set $S$ are studied. Let $k$ be a field and $k(S)$ be the field freely generated over $k$ by the set $S$ (endowed with the natural $G$-action). One of principal results describes the Gabriel spectrum of the category of smooth $k(S)$-semilinear representations of $G$. It is also shown, in particular, that (i) for any smooth $G$-field $K$ any smooth finitely generated $K$-semilinear representation of $G$ is noetherian, (ii) for any $G$-invariant subfield $K$ in the field $k(S)$, the object $k(S)$ is an injective cogenerator of the category of smooth $K$-semilinear representations of $G$, (iii) if $K\subset k(S)$ is the subfield of rational homogeneous functions of degree 0 then there is a one-dimensional $K$-semilinear representation of $G$, whose integral tensor powers form a system of injective cogenerators of the category of smooth $K$-semilinear representations of $G$, (iv) if $K\subset k(S)$ is the subfield generated over $k$ by $x-y$ for all $x,y\in S$ then there is a unique isomorphism class of indecomposable smooth $K$-semilinear representations of $G$ of each given finite length.