Titlebook: Galois Theory; Joseph Rotman Textbook 1998Latest edition Springer Science+Business Media New York 1998 Galois group.Galois theory.Group th

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Irreducible Polynomials,Our next project is to find some criteria for irreducibility of polynomials; this is usually difficult, and it is unsolved in general.

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The Galois Group,We now set up an analogy with symmetries of polygons in the plane even though some of the algebraic analogues have not yet been defined.

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Independence of Characters,This section introduces the important notion of a fixed field, and characters are used to compute its degree over a base field.

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Galois Extensions,Our discussion of Galois groups began with a . of fields, namely, an extension . / . that is a splitting field of some polynomial .(.) ∈ .[x]. We are now going to characterize those extension fields of . that are splitting fields of some polynomial in .[.].

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