Regular expressions are actually implemented by DFA, deterministic finite automata and can mathematically be described as non-deterministic finite automata as well. These models are very simple and I think you only need to learn the basics to get the logic behind it:

We have an alphabet of symbols A, e.g. A = { a,b } or in a real application a lot of different characters e.g. UTF-8. Then we have nodes in a graph, where one is the start node.

These nodes can be connected using transitions that consume one character of input and then we go to a new node (or the same node).

So lets say we want a regular expression that takes 3 a and then 1 b for a match, it can be viewed as the following DFA:

```
start-> () -a-> () -a-> () -a-> () -b-> end
```

If we allow loops then we get the following type of regexp a* we can stay in the same node by consuming an a. Take a look at http://en.wikipedia.org/wiki/Deterministic_finite_automaton

I don't think it is smart to get bogged down in implementation details of different programming languages and text encoding. It is best to understand the logic first, then the rest is just details.

I would compare starting with e.g. pythons regex docs before learning the theory to starting to do integration by parts in mathematica without knowing about calculus, it will seem like magic, but in reality it is not very hard, rather it is very elegant and fun to learn and understand!