Normal extension/Related Articles: Difference between revisions

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Field (mathematics) [r]: An algebraic structure with operations generalising the familiar concepts of real number arithmetic. ^[e]
Field automorphism [r]: An invertible function from a field onto itself which respects the field operations of addition and multiplication. ^[e]
Field extension [r]: A field containing a given field as a subfield. ^[e]
Galois theory [r]: Algebra concerned with the relation between solutions of a polynomial equation and the fields containing those solutions. ^[e]
Splitting field [r]: A field extension generated by the roots of a polynomial. ^[e]

Field extension [r]: A field containing a given field as a subfield. ^[e]
Normal closure [r]: Add brief definition or description
Conductor of a number field [r]: Used in algebraic number theory; a modulus which determines the splitting of prime ideals. ^[e]
Separable extension [r]: A field extension in which all elements are separable. ^[e]
Closure operator [r]: An idempotent unary operator on subsets of a given set, mapping a set to a larger set with a particular property. ^[e]

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+==Articles related by keyphrases (Bot populated)==
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+{{r|Separable extension}}
+{{r|Closure operator}}