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Galois theory question

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Grant Sedgwick

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Nov 14, 2009, 7:43:53 PM11/14/09
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Can anyone please explain why the following statement is true?
Unfortunately the text omitted a proof.

If K and L are fields where L is a finite extension of K, then there exists
a polynomial f(x) in K[x] so that L is contained in the splitting field of
f(x) over K.

Many thanks.


Arturo Magidin

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Nov 15, 2009, 12:12:17 AM11/15/09
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Since L is a finite extension of K, there is a finite basis for L over
K, a1,...,an.

let f_i(x) be the minimal polynoomial of a_i over K. Let f(x) = f1(x)
*...*fn(x). Then the splitting field of f(x) over K certainly contains
a1,...,an, hence contains L.

There are, of course, other ways of doing this, but this particular
sledgehammer is sure to work.

--
Arturo Magidin

Grant Sedgwick

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Nov 15, 2009, 2:07:55 PM11/15/09
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Great! Cheers.


"Arturo Magidin" <mag...@member.ams.org> wrote in message
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