THE FUNDAMENTAL THEOREM OF GALOIS THEORY
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Publication:3832736
DOI10.1070/SM1989v064n02ABEH003313zbMath0677.18003OpenAlexW1979086029MaRDI QIDQ3832736
Publication date: 1989
Published in: Mathematics of the USSR-Sbornik (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1070/sm1989v064n02abeh003313
Separable extensions, Galois theory (12F10) Categories admitting limits (complete categories), functors preserving limits, completions (18A35) Galois theory and commutative ring extensions (13B05)
Related Items (18)
Unnamed Item ⋮ Radicals of rings and pullbacks ⋮ Galois theory and a general notion of central extension ⋮ Light morphisms for generalized \(T_0\)-reflections ⋮ Effective codescent morphisms, amalgamations and factorization systems ⋮ Monotone-light factorisation systems and torsion theories ⋮ Comprehensive factorization and \(I\)-central extensions ⋮ Grothendieck's extension of the fundamental theorem of Galois theory in abstract categories ⋮ Galois theory for braided tensor categories and the modular closure ⋮ Some remarks on protolocalizations and protoadditive reflections ⋮ Galois theory in variable categories ⋮ Covering morphisms in categories of relational algebras ⋮ Composites of central extensions form a relative semi-abelian category ⋮ A relative monotone-light factorization system for internal groupoids ⋮ Strict monadic topology. I: First separation axioms and reflections ⋮ Galois groups, abstract commutators, and Hopf formula ⋮ Locally semisimple coverings ⋮ Protoadditive functors, derived torsion theories and homology
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