Math 31 serves two purposes. The first is suggested by the course title: students should learn the basics of abstract algebra. This means that students should leave Math 31 with a solid understanding of various algebraic structures, specifically structures called groups and rings. They should also be fluent in the concepts of homomorphism and isomorphism, along with many other definitions and results that accompany these ideas.
The second objective of Math 31 is much broader. En route to becoming well-versed in the ideas of modern algebra, students should learn to think like a modern mathematician. In particular, a course like this should help the students learn to read and write abstract mathematics. Both are very much acquired skills, and their development will be nurtured in the course. The most central skill to be developed will be the understanding of mathematical proofs. Students will need to learn how to read proofs, study how they are composed, and become proficient at constructing proofs of their own.
The course will progress tentatively as follows. We will begin by reviewing the main ideas of sets and functions, and from there we will begin our study of group theory. This should take roughly the first half of the course, after which we will have the midterm exam. We will then spend two to three weeks on ring theory. The course will end with some special topics and possibly applications of algebra, depending on the interests of the class. A more detailed schedule will be available on the course webpage, and any updates to the course structure will appear there.
Since the reading and writing of proofs is high on our list of objectives, many aspects of the course will be designed to develop these skills. For example, you will be strongly encouraged to read the textbook regularly. Also, the first few x-hours will be used as ``workshops'' for developing proof-writing skills. These will be purely for your benefit, and if you've already taken a proof-intensive class, you need not come regularly. After the first few weeks, we may continue the workshops if there is need, or we may begin using the x-hours to cover extra material and/or special topics.
Abstract Algebra, Third Edition |
This is the required textbook for the course. It will be available at Wheelock Books. It is also likely that you can find used copies from other sources, but please check to make sure that the edition matches the one that we are using.
In addition to the required text, there will be a supplementary text:
Contemporary Abstract Algebra, Seventh Edition, by Joseph Gallian
This book will be placed on reserve at Baker-Berry Library. I do not recommend that you purchase a copy. However, it is often used as the textbook for Math 31, and it may be helpful to look at from time to time.
The course grade will be computed as follows:
Assignment |
Number |
Percent of Grade |
Midterm |
1 |
30 |
Final |
1 |
30 |
Homework |
8 |
25 |
Project |
1 |
15 |
I expect that you will attend class every day. Though it is not officially a part of the course grade, missing class could indirectly affect your performance through homework and exams. In particular, I will not always cover topics from the same perspective as the textbook, and we will even cover some things in class that are not mentioned in the book. Therefore, it would be best to attend class regularly. Additionally, a course like Math 31 is intended to help you build mathematical maturity by learning to read and write proofs, and lectures and in-class discussion will help greatly with this.
On a side note, I will give suggested reading assignments after each class. I highly recommend that you look at them, since they will give you a preview of the next lecture, and they will help you become more comfortable with reading mathematics. I don't expect you to understand every single theorem and its proof on a first reading, but seeing the material ahead of time will likely help you to follow the next day's lecture.
Exams: Any exam labeled as in-class is closed book, with no notes or textbooks allowed. No help will be given or received. On take-home exams, collaboration is not permitted in any form, and no help will be given or received. The use of books and notes on take-home exams will be allowed at the instructor's discretion. Such sources will generally be limited to the course text(s) and your lecture notes. Electronic resources (i.e., the internet) will be forbidden.
Homework: You are welcome to discuss your homework with your classmates and the instructor, but the final result should be your own work. You are actually encouraged to collaborate with your classmates, but in the end you should always write up your own solutions. That is, you are free to discuss problems with each other and even work out ideas together, but you should write up your solutions by yourself. You should also credit the classmates with whom you worked when you write up your solutions. See the homework page for more details on collaboration. Also, you may not look up solutions to homework problems on the internet.
Students with disabilities enrolled in this course and who may need disability-related classroom accommodations are encouraged to make an appointment to see your instructor before the end of the second week of the term. All discussions will remain confidential, although the Student Accessibility Services office may be consulted to discuss appropriate implementation of any accommodation requested.
Some students may wish to take part in religious observances that occur during this academic term. If you have a religious observance that conflicts with your participation in the course, please meet with your instructor before the end of the second week of the term to discuss appropriate accommodations.