Module regex_automata::nfa

source ·
Expand description

Provides non-deterministic finite automata (NFA) and regex engines that use them.

While NFAs and DFAs (deterministic finite automata) have equivalent theoretical power, their usage in practice tends to result in different engineering trade offs. While this isn’t meant to be a comprehensive treatment of the topic, here are a few key trade offs that are, at minimum, true for this crate:

  • NFAs tend to be represented sparsely where as DFAs are represented densely. Sparse representations use less memory, but are slower to traverse. Conversely, dense representations use more memory, but are faster to traverse. (Sometimes these lines are blurred. For example, an NFA might choose to represent a particular state in a dense fashion, and a DFA can be built using a sparse representation via sparse::DFA.
  • NFAs have espilon transitions and DFAs don’t. In practice, this means that handling a single byte in a haystack with an NFA at search time may require visiting multiple NFA states. In a DFA, each byte only requires visiting a single state. Stated differently, NFAs require a variable number of CPU instructions to process one byte in a haystack where as a DFA uses a constant number of CPU instructions to process one byte.
  • NFAs are generally easier to amend with secondary storage. For example, the thompson::pikevm::PikeVM uses an NFA to match, but also uses additional memory beyond the model of a finite state machine to track offsets for matching capturing groups. Conversely, the most a DFA can do is report the offset (and pattern ID) at which a match occurred. This is generally why we also compile DFAs in reverse, so that we can run them after finding the end of a match to also find the start of a match.
  • NFAs take worst case linear time to build, but DFAs take worst case exponential time to build. The hybrid NFA/DFA mitigates this challenge for DFAs in many practical cases.

There are likely other differences, but the bottom line is that NFAs tend to be more memory efficient and give easier opportunities for increasing expressive power, where as DFAs are faster to search with.

Why only a Thompson NFA?

Currently, the only kind of NFA we support in this crate is a Thompson NFA. This refers to a specific construction algorithm that takes the syntax of a regex pattern and converts it to an NFA. Specifically, it makes gratuitous use of epsilon transitions in order to keep its structure simple. In exchange, its construction time is linear in the size of the regex. A Thompson NFA also makes the guarantee that given any state and a character in a haystack, there is at most one transition defined for it. (Although there may be many epsilon transitions.)

It possible that other types of NFAs will be added in the future, such as a Glushkov NFA. But currently, this crate only provides a Thompson NFA.

Modules