On maximal proper subgroups of field automorphism groups

Abstract

Let G be the automorphism group of an extension F|k of algebraically closed fields of characteristic zero and of transcendence degree n, 1 n∞. In this paper we (i) construct some maximal closed non-open subgroups Gv, and some (all, in the case of countable transcendence degree) maximal open proper subgroups of G; (ii) describe, in the case of countable transcendence degree, the automorphism subgroups over the intermediate subfields (a question of Krull, [4, question 3b)]krull); (iii) construct, in the case n=∞, a fully faithful subfunctor (-)v of the forgetful functor from the category of smooth representations of G to the category of smooth representations of Gv; (iv) construct, using the functors (-)v, a subfunctor of the identity functor on the category of smooth representations of G, coincident (via the forgetful functor) with the functor on the category of smooth admissible semilinear representations of G constructed in adm in the case n=∞ and k= Q. The study of open subgroups is motivated by the study of (the stabilizers of the) smooth representations undertaken in repr,adm. The functor is an analogue of the global sections functor on the category of sheaves on a smooth proper algebraic variety. Another result is that `interesting' semilinear representations are `globally generated'.

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