Math 361, Spring 2015, Assignment 13

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Carefully define the following terms, then give one example and one non-example of each:

  1. Solvable by radicals (you may have trouble coming up with non-examples; see pp. 473-474 if you really want one, though I won't quiz you on this).
  2. Automorphism (of an extension $F\rightarrow E$).
  3. Galois group (of an extension $F\rightarrow E$).
  4. Fixed field (of a subgroup of a Galois group).
  5. Meet (of two subgroups).
  6. Join (of two subgroups).
  7. Product (of two subgroups).

Carefully state the following theorems (you do not need to prove them):

  1. Fundamental theorem of Galois theory (this is not in the book in any recognizable form, though it is technically encompassed by Theorem 53.6; I recommend consulting lecture notes for a more concise form of the theorem).
  2. Theorem relating products to joins.
  3. First isomorphism theorem.
  4. Second isomorphism theorem.
  5. Third isomorphism theorem.

Solve the following problems:

  1. Section 34, problems 1, 3, 5, and 7.
--------------------End of assignment--------------------

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Solutions:

Problems:

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