To save carrying the original paperwork about, and to give myself a recap on the material, I’ve written up the lecture notes from MA40037:Galois Theory as taught at the University of Bath by Geoff Smith.

The content is broadly as follows: Rings, Integral Domains, Fields of Fractions, Units, Ideals, Homomorphisms, The First Isomorphism Theorem, The Chinese Remainder Theorem, Irreducibles, Field Extensions, Characteristic, Minimal Polynomials and Algebraic Numbers, Galois Theory.

The notes very closely match those I made and hence the lectures given, except the section on the Chinese Remainder Theorem, which was adapted from problem sheets. There have been various minor linguistic tweaks, but few mathematical ones.

It should be noted (to avoid confusion under composition) that the convention of writing function arguments to the left (i.e., (x)f rather than f(x)) is adopted here; and that square brackets are sometimes used for factors in polynomials where these appear in expressions also featuring function or polynomial evaluations (which are denoted by round brackets).

Proof reading would be appreciated!