※ 引述《PttFund (批踢踢基金只进不出)》之铭言： : Let F be a field and let f(x) be an irreducible polynomial : of degree 3 over F. Suppose that L is an extension of F of : degree 6 such that f(x) splits into linear factors over L. : Prove that there exists a proper intermediate field K such : that K is Galois over F. Suppose f(x) is separable. 1. If L is the splitting over F of f(x), then the Galois group of f(x) over F is isomorphic to S3 which has a normal subgroup A3. Hence the fixed field of A3 is Galois over F. 2. Otherwise the splitting field K of f(x) over F is a proper intermediate field which is Galois over F. Suppos f(x) is inseparable.(This may happen) Then there exists a intermediate field K such that [K:F]=2 Hence K is Galois over F. ex: F=Z3(t^3) {The rational fucntion field over Z3} f(x)= x^3 -t^3 is irreducible over F with splitting field Z3(t) over F which is not Galois over F. ~~ 好像写太长了 本来也没有这麽长的 --

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