Math 361, Spring 2016, Assignment 4
From cartan.math.umb.edu
Carefully define the following terms, then give one example and one non-example of each:[edit]
- Divisibility relation (i.e. $a|b$ where $a$ and $b$ are elements of a domain $D$).
- Associate (of an element of a domain).
- Irreducible element (of a domain).
- Ideal (in any ring $R$).
- Principal ideal (generated by an element $a$ of a commutative ring $R$).
- Principal ideal domain (or PID).
- Standard representation (of an element of the quotient ring $F[x]/\left\langle p\right\rangle$).
Carefully state the following theorems (you do not need to prove them):[edit]
- Theorem concerning ideals of $F[x]$.
- Theorem concerning uniqueness of standard representations in $F[x]/\left\langle p\right\rangle$.
Carefully describe the following algorithms:[edit]
- Ideal membership test for $F[x]$ (i.e. given an arbitrary ideal $I$ in $F[x]$ and an arbitrary polynomial $f\in F[x]$, describe an algorithm that decides whether $f$ is a member of $I$).
Solve the following problems:[edit]
- Prove that the quotient ring $\mathbb{Z}_2[x]/\left\langle x^2+x+1\right\rangle$ is finite by actually counting its elements.
- Make addition and multiplication tables for the ring defined above. Is this ring a field?
- Make addition and multiplication tables for $\mathbb{Z}_2[x]/\left\langle x^2+x\right\rangle$. Is this ring a field?
- Is every finite field isomorphic to $\mathbb{Z}_p$ for some prime number $p$?
