Math 361, Spring 2021, Assignment 12

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Sieve of Eratosthenes (to find irreducible positive integers up to a predetermined value).
Sieve of Eratosthenes (to find irreducible polynomials in $F[x]$, where $F$ is a finite field, up to a predetermined degree).

Section 23, problems 9, 10, 11, 12, 13, 14, 19, 21, 29, and 30.
Recall the norm function $N:\mathbb{Z}[\sqrt{-5}]\rightarrow\mathbb{Z}$ defined by the formula $N(a+bi\sqrt{5})=a^2+5b^2$. Show that every element of norm $1$ is a unit of $\mathbb{Z}[\sqrt{-5}]$.
Compute $N(1+i\sqrt{5})$ and $N(1-i\sqrt{5})$.
Show that $\mathbb{Z}[\sqrt{-5}]$ has no elements of norm $2$ and no elements of norm $3$.
Prove that $1+i\sqrt{5}$ is an irreducible element of $\mathbb{Z}[\sqrt{-5}]$. (Hint: for any elements $z_1,z_2\in\mathbb{Z}[\sqrt{-5}]$, we have $N(z_1z_2)=N(z_1)N(z_2)$.) Similarly, prove the $1-i\sqrt{5}$ is an irreducible element.
Use similar techniques to prove that $2$ and $3$ are both irreducible in $\mathbb{Z}[\sqrt{-5}]$.
Prove that $\mathbb{Z}[\sqrt{-5}]$ is not a unique factorization domain. (Hint: in the lectures we gave two essentially different factorizations of $6$ in this ring; now you know that these really were "complete" factorizations, i.e. factorizations into irreducible elements.)

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