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http://dbpedia.org/resource/Regular_extension
http://dbpedia.org/ontology/abstract In field theory, a branch of algebra, a fiIn field theory, a branch of algebra, a field extension is said to be regular if k is algebraically closed in L (i.e., where is the set of elements in L algebraic over k) and L is separable over k, or equivalently, is an integral domain when is the algebraic closure of (that is, to say, are linearly disjoint over k).is, to say, are linearly disjoint over k).
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rdfs:comment In field theory, a branch of algebra, a fiIn field theory, a branch of algebra, a field extension is said to be regular if k is algebraically closed in L (i.e., where is the set of elements in L algebraic over k) and L is separable over k, or equivalently, is an integral domain when is the algebraic closure of (that is, to say, are linearly disjoint over k).is, to say, are linearly disjoint over k).
rdfs:label Regular extension
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