Definitions from Wiktionary (Galois extension)
▸ noun: (algebra, Galois theory) An algebraic extension that is both a normal and a separable extension; equivalently, an algebraic extension E/F such that the fixed field of its automorphism group (Galois group) Aut(E/F) is the base field F.
▸ Words similar to Galois extension
▸ Usage examples for Galois extension
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▸ noun: (algebra, Galois theory) An algebraic extension that is both a normal and a separable extension; equivalently, an algebraic extension E/F such that the fixed field of its automorphism group (Galois group) Aut(E/F) is the base field F.
Similar:
Galois group,
Galois theory,
separable extension,
Galois field,
algebraic extension,
finite field,
normal extension,
algebraic closure,
splitting field,
simple extension,
more...
▸ Words similar to Galois extension
▸ Usage examples for Galois extension
▸ Idioms related to Galois extension
▸ Wikipedia articles (New!)
▸ Words that often appear near Galois extension
▸ Rhymes of Galois extension
▸ Invented words related to Galois extension