Galois Connections and Applications 2004
DOI: 10.1007/978-1-4020-1898-5_2
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Categorical Galois Theory: Revision and Some Recent Developments

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Cited by 12 publications
(10 citation statements)
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“…The categorical theory of central extensions was later introduced by Janelidze and Kelly in [22] as a special case of the general Galois theory (see [3] or [21] for an account of various recent developments). This theory introduces a notion of centrality for an extension in any Barr exact category C [1] which is relative to V. Rossi (B) Dipartimento di Matematica e Informatica, Università degli Studi di Udine, Via delle Scienze 206, 33100 Udine, Italy e-mail: rossi@dimi.uniud.it the choice of a full reflective subcategory X in C satisfying a certain admissibility condition.…”
Section: Introductionmentioning
confidence: 99%
“…The categorical theory of central extensions was later introduced by Janelidze and Kelly in [22] as a special case of the general Galois theory (see [3] or [21] for an account of various recent developments). This theory introduces a notion of centrality for an extension in any Barr exact category C [1] which is relative to V. Rossi (B) Dipartimento di Matematica e Informatica, Università degli Studi di Udine, Via delle Scienze 206, 33100 Udine, Italy e-mail: rossi@dimi.uniud.it the choice of a full reflective subcategory X in C satisfying a certain admissibility condition.…”
Section: Introductionmentioning
confidence: 99%
“…Using again the equivalence between B-precrossed modules and internal reflexive graphs over B in Lie, we find that (21) where k ∈ Ker(f ) and k ′ ∈ Ker(g). Since the commutator in equation (22) can be treated exactly as the commutator in (20), we find that the double extension (21) where both sides are ideals of L 1 .…”
Section: Proof As Inmentioning
confidence: 98%
“…All these results apply when E is the class of regular epimorphisms in 2-Eq(C); indeed, in that case monadic extensions are exactly the same as effective descent morphisms and, moreover, Conn(C) is a strongly E-Birkhoff subcategory of 2-Eq(C) by Proposition 1. We will need, however, to restrict our attention to a smaller class of extensions, which we will call fibrations; this term was already used in [22] to denote the classes of arrows occurring in a Galois structure.…”
Section: Of Extensions Is a Double Extension If And Only If In The DImentioning
confidence: 99%
“…For more details, we refer the interested reader to the book by Borceux and Janelidze [6], or to the recent articles [17,21].…”
Section: Conventionmentioning
confidence: 99%