Analogue of the Galois Theory for arbitrary finite field extensions

Abstract

This paper is a finishing touch to the (over 200 years) classical `Galois Theory' of arbitrary finite field extensions, i.e. the goal of it is to describe intermediate subfields of an arbitrary finite field extension via invariants of `natural/obvious' objects that are associated with subfields via two Galois-type correspondences. The classical Galois Theory covers the case of finite Galois field extensions. For finite Galois field extensions the objects are their Galois groups and their invariants. In GaloisTh-RingThAp, we introduce a new (ring theoretic) approach to the Galois Theory which is based on the principle of maximal symmetry. In AnGaloisTh-NORMAL-Fields, the maximal symmetry of normal finite field extensions yields an analogue of the Galois Theory for them. For a normal finite field extension L/K the `natural/obvious' objects are the subalgebra (L/K) G(L/K) of (L/K) that is generated by the automorphism group G(L/K) and the algebra (L/K) of differential operators on L/K and its `invariants'. The `maximal symmetry' means the equality (L/K)= (L/K) G(L/K) which turns out to be a characteristic property of normal finite field extensions, AnGaloisTh-NORMAL-Fields. The aim of this paper is to obtain an analogue of the Galois Theory for arbitrary finite field extensions based on results and ideas of GaloisTh-RingThAp and AnGaloisTh-NORMAL-Fields.

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