Splitting field: Difference between revisions

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In [[algebra]], a '''splitting field''' for a polynomial ''f'' over a field ''F'' is a [[field extension]] ''E''/''F'' with the properties that ''f'' splits completely over ''E'', but not not any subfield of ''E'' containing ''F''.
In [[algebra]], a '''splitting field''' for a polynomial ''f'' over a field ''F'' is a [[field extension]] ''E''/''F'' with the properties that ''f'' splits completely over ''E'', but not any subfield of ''E'' containing ''F''.


A splitting field for a given polynomial always exists, and is unique up to [[field isomorphism]].
A splitting field for a given polynomial always exists, and is unique up to [[field isomorphism]].

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In algebra, a splitting field for a polynomial f over a field F is a field extension E/F with the properties that f splits completely over E, but not any subfield of E containing F.

A splitting field for a given polynomial always exists, and is unique up to field isomorphism.

References