Math 360, Fall 2016, Assignment 5
From cartan.math.umb.edu
I was at the mathematical school, where the master taught his pupils after a method scarce imaginable to us in Europe. The proposition and demonstration were fairly written on a thin wafer, with ink composed of a cephalic tincture. This the student was to swallow upon a fasting stomach, and for three days following eat nothing but bread and water. As the wafer digested the tincture mounted to the brain, bearing the proposition along with it.
- - Jonathan Swift, Gulliver's Travels
Carefully define the following terms, then give one example and one non-example of each:
- Substructure.
- Subgroup.
- Subgroup generated by a subset.
- Finitely generated group.
- Cyclic subgroup (generated by a given element).
- Cyclic group.
- Order (of an element).
Carefully state the following theorems (you do not need to prove them):
- Theorem concerning intersections and unions of subgroups.
- Theorem concerning integer division.
- Classification of cyclic groups.
Solve the following problems:
- Section 5, problems 1, 2, 8, 9, 22, 23, and 27.
- Section 6, problems 1, 3, 17, and 19.
- Complete the proof of the classification of cyclic groups. (Specifically, recall that $G$ is a cyclic group generated by $a$, in which the powers of $a$ are not all distinct, and $n$ is the least positive integer for which $a^n=e$. We defined $\phi:\mathbb{Z}_n\rightarrow G$ by the formula $\phi([i]_{\equiv_n}) = a^i$, and we showed that this is indeed a well-defined function, whose output does not depend on the choice of the class representative $i$. To complete the proof, show that $\phi$ is injective, surjective, and preserves operations.)
