Math 361, Spring 2016, Assignment 2
From cartan.math.umb.edu
Carefully define the following terms, then give one example and one non-example of each:[edit]
- (Unital) embedding (of one unital ring into another).
- Field of fractions (of an integral domain).
- Polynomial (with coefficients in a commutative unital ring $R$).
- Addition (of polynomials).
- Multiplication (of polynomials).
Carefully state the following theorems (you do not need to prove them):[edit]
- Theorem characterizing which rings can be embedded in fields.
- Uniqueness theorem for fields of fractions.
- Existence theorem for fields of fractions.
Solve the following problems:[edit]
In the following problems, let $D$ be the set of complex numbers whose real and imaginary parts are both integers, i.e. $D=\{n+mi\,|\,n,m\in\mathbb{Z}\}$. (The elements of $D$ are called Gaussian integers.)
- Prove that $D$ is an integral domain. (Hint: it is a unital subring of $\mathbb{C}$.)
- Give two or three concrete sample calculations in the field of fractions $F(D)$.
- Let $\phi:D\rightarrow\mathbb{C}$ denote the inclusion map. Then $\phi$ is an embedding of $D$ into a field, so we have a unique embedding $\widehat{\phi}:F(D)\rightarrow\mathbb{C}$ making $\widehat{\phi}\circ\iota = \phi$. Describe the image of $\widehat{\phi}$. (This is a subfield of $\mathbb{C}$ isomorphic to $F(D)$.)
- Section 22, problems 1, 3, and 5.
