Math 361, Spring 2021, Assignment 13

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Maximal ideal.
Principal ideal domain.
Prime ideal (we did not discuss this in class; it is Definition 27.13 in the text).

Lemma regarding ideals which contain units.
Theorem relating maximal ideals to fields.
Containment criterion for principal ideals.
Equality criterion for principal ideals.
Theorem concerning ideals of $\mathbb{Z}$ (i.e. " $\mathbb{Z}$ is a...").
Theorem concerning ideals of $F[x]$ (i.e. " $F[x]$ is a...").
Theorem relating maximal ideals to irreducible elements in principal ideal domains.
Theorem relating prime ideals to integral domains (we did not discuss this in class; it is Theorem 27.15 in the text).
Theorem relating maximal ideals to prime ideals (we did not discuss this in class; it is Corollary 27.16 in the text).

Section 26, problem 24. (Hint: Since $F$ is a field and is isomorphic to $F/\{0\}$ , we know that $\{0\}$ is a maximal ideal; from this we can write a list of all the ideals of $F$ .)
Section 27, problems 1, 2, 3, 5, 7, 9, and 18.
Find an irreducible polynomial of degree $4$ in $\mathbb{Z}_2[x]$ . (Hint: this can be done with the Sieve, but there is a shorter way. First make a list of all irreducible polynomials of degree $2$ ; these are just the quadratics with no roots, and there is a simple pattern that predicts which polynomials will have roots in $\mathbb{Z}_2$ . Next, write down a degree $4$ polynomial which has no roots, and test it for divisibility by the irreducible quadratics. If your root-free quartic is divisible by an irreducible quadratic, throw it away and try another root-free quartic, continuing until you find a root-free quartic which is not divisible by any irreducible quadratic.)
Construct a field with exactly sixteen elements. (Hint: the result of the previous question is directly relevant to this one.) Prove that your ring really is a field, without writing down the whole multiplication table.

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