07-401/Class Notes for March 7: Difference between revisions

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07-401 March 7 NOTES
07-401 March 7 NOTES
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Revision as of 22:38, 7 March 2007


Class Plan

Some discussion of the term test and HW6.

Some discussion of our general plan.

Lecture notes

Extension Fields

Definition. An extension field of .

Theorem. For every non-constant polynomial in there is an extension of in which has a zero.

Example over .

Example over .

Definition. .

Theorem. If is a root of an irreducible polynomial , within some extension field of , then , and (here ) is a basis for over .

Corollary. In this case, depends only on .

Splitting Fields

Definition. splits in , a splitting field for over .

Theorem. A splitting field always exists.

Example. over .

Example. Factor within its splitting field .

Theorem. Any two splitting fields for over are isomorphic.

Lemma 1. If irreducible over , an isomorphism, a root of (in some ), a root of in some , then .

Lemma 2. Isomorphisms can be extended to splitting fields.

Zeros of Irreducible Polynomials

Definition. The derivative of a polynomial.

Claim. The derivative operation is linear and satisfies Leibnitz's law.

Theorem. has a multiple zero in some extension field of iff and have a common factor of positive degree.

Lemma. The property of "being relatively prime" is preserved under extensions.

Theorem. Let be irreducible. If , then has no multiple zeros in any extension of . If , then has multiple zeros (in some extension) iff it is of the form for some .

Definition. A perfect field.

Theorem. A finite field is perfect.

Theorem. An irreducible polynomial over a perfect field has no multiple zeros (in any extension).

Theorem. Let be irreducible and let be the splitting field of over . Then in all zeros of have the same multiplicity.

Corollary. as above must have the form for some and .

Example. is irreducible and has a single zero of multiplicity 2 within its splitting field over .


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