Introduction to Abstract Algebra/Problem set 3

In the following exercises, you are prompted to give proofs which support the statements. Let ${\displaystyle e}$ denote the identity element of some group.

1. Prove that if ${\displaystyle ca=cb}$ or ${\displaystyle ac=bc}$, then ${\displaystyle a=b}$.
2. Prove that if ${\displaystyle abc=e}$, then ${\displaystyle abc=bca=cab=c^{-1}{b}^{-1}{a}^{-1}=b^{-1}{a}^{-1}{c}^{-1}=a^{-1}{c}^{-1}{b}^{-1}=(abc{)}^{-1}}$.

In the following exercises, you are prompted for proofs supporting the statements regarding various subsets of the real numbers, ${\displaystyle ℝ}$. For reference, ${\displaystyle {ℝ}^{+}=\{x\in ℝ|x>0\}}$ and ${\displaystyle {ℝ}^{-}=\{x\in ℝ|x<0\}}$.

1. Prove that ${\displaystyle ({ℝ}^{-},\diamond )}$ is a group where ${\displaystyle a\diamond b=-ab}$ for ${\displaystyle a,b\in {ℝ}^{-}}$.
2. Prove that ${\displaystyle ({ℝ}^{+},+)}$ does not form a group.
3. Prove that a homomorphism from ${\displaystyle ({ℝ}^{+},\cdot )}$ to ${\displaystyle ({ℝ}^{-},\diamond )}$ exists.
4. Prove that a homomorphism from ${\displaystyle ({ℝ}^{-},\diamond )}$ to ${\displaystyle ({ℝ}^{+},\cdot )}$ exists.
5. Prove that there is a bijection, ${\displaystyle h:{ℝ}^{+}\to {ℝ}^{-}}$ for which it is true that ${\displaystyle h(a\cdot b)=h(a)\diamond h(a)}$ and ${\displaystyle h^{-1}(c\diamond d)=h^{-1}(c)\cdot h^{-1}(d)}$. We say that ${\displaystyle h}$ is an isomorphism between the two groups.