Groups, Rings, and Fields

Detailed Information

Course Description

We will study the core objects in abstract algebra: groups, rings and fields. The term ``abstract'' highlights the approach to mathematics that emerged in the 20th century in which there was less reference to ``real objects'' and a greater emphasis on proving theorems from a small set of simple axioms. For example, the symmetries of a 3-dimensional object tell you something about the nature of the object. But, symmetry itself is interesting. Symmetries of an object can be composed (apply one then another) and produce another symmetry. Each symmetry has an inverse, which undoes the given symmetry. Abstractly, one can consider the properties of a set (e.g. symmetries) with an operation (e.g. composition) and an inverse to the operation. We call such an object a group. Discovering the structure and properties of abstracts groups was a massive project in the last century.

Ring theory evolves from recognizing that the basic properties of the integers (from grade school!)---two operations (+, *), with commutativity, associativity, distributivity---extend to polynomials and can be extended further to abstractly defined objects. Similarly, the properties of the rational numbers (now every nonzero element has a multiplicative inverse) can be considered in an abstract axiomatic way. This is the area called field theory.

I love this material because it gives a deeper and richer understanding of school mathematics, but also unveils a world of very complex and intricate beauty.

Resources

• O'Sullivan, Groups, Rings, and Fields Course notes in progress!

  Required.

• Hungerford, Abstract Algebra: An Introduction 2nd ed.

  (Recommended) This is the textbook we use for our undergraduate algebra courses. It is well written and should be a nice reference to flesh out details and give examples.

• David Dummit, Richard Foote, Abstract Algebra. A massive standard reference for graduate level algebra, full of examples and detailed proofs.

• Gallian, Contemporary Abstract Algebra.

  (Alternative possibility) A widely used and well written text that can also be a reference.

• Judson and Beezer, Abstract Algebra: Theory and Applications

  (Alternative possibility) This is another good undergraduate algebra text. Available free online. See the button for "Sage and AATA." Download "Sage Worksheet Collection." Open the zip file from the sage notebook.

• Ash, Robert, Abstract Algebra: The basic graduate year .

  Available online.

• SDSU Sage Tutorial Updated 2019. Sage Tutorials Magma online calculator.

Prerequisites

Primary Topics

Some of the following topics will be familiar from your undergraduate course. We will cover them in greater depth, and with more attention to details. I expect this material to take 9 weeks.

• Groups: Normal subgroups and the isomorphism theorems. Finite abelian groups, semi-direct products, simple groups, group presentations.
• Commutative Rings: Ideals, homomorphisms, and quotient rings of polynomial rings over a field. Modules.
• Fields: Field extensions. Adjoining a root of a polynomial. Splitting field of a polynomial. Finite fields.

Format

Learning Outcomes

• [Foundational knowledge.] State major definitions, axioms, and theorems and use examples to illustrate.
• [Use logical reasoning.] Read a proof and explain the logic and derivations. Write a mathematical proof using an appropriate method.
• [Use algebraic tools and methods.] Derive answers, apply algorithms, and compute, both by hand and using mathematics software.
• [Explore mathematical ideas independently.] Have confidence to read challenging material that is beyond that explored in a textbook or class.
• [Communicate mathematical ideas effectively.] Make progress toward the mathematicians goal: writing that gets to the essence of the matter and is brief, clear, and polished.
• [Nurture the learning of others.] Work with others in a way that is collegial, inclusive and empowering. Contribute, but seek understanding of other perspectives.