As I had no idea this stuff existed in the computer science world, please disregard this answer ;)

I don't think the two fields (no pun intended) have any overlap. Rings/fields/groups deal with *mathematical* objects. Consider a part of the definition of a field:

For every a in F, there exists an element −a in F, such that a + (−a) = 0. Similarly, for any a in F other than 0, there exists an element a^−1 in F, such that a · a^−1 = 1. (The elements a + (−b) and a · b^−1 are also denoted a − b and a/b, respectively.) In other words, subtraction and division operations exist.

What the heck does this mean in terms of programming? I surely can't have an additive inverse of a `list`

object in Python (well, I could just destroy the object, but that is like the *multiplicative* inverse. I guess you could get somewhere trying to define a Python-ring, but it just won't work out in the end). Don't even *think* about dividing `lists`

...

As for code readability, I have absolutely no idea how this can even be applied, so this application is irrelevant.

This is my interpretation, but being a mathematics major probably makes me blind to other terminology from different fields (you know which one I'm talking about).