## A PLAY ON REGULAR EXPRESSIONS PART 4: ARE WE DONE HERE?

When last we left our hero, he had successfully implemented Rigged Regular Expressions in Rust.

There's been a lot of progress since then.

## Matt Might's Parse Result Data Type Is A Semiring!

One of my strongest intuitions when I started reading *A Play on Regular Expressions* was that under the covers Matt Might's implementation of Brzozowski's Regular Expressions used a data structure exactly like those in the *Play* paper. I was correct; I was able to implement a (non-recursive) Brzozowski engine in Haskell, and use a Semiring formalism to accurately reproduce Might's outcome and data structure from *Parsing With Derivatives: A Functional Pearl*.

### And Might's parser-combinators are functors between semirings!

To me, this is something of a monumental discovery. Intellectually, I'm happy to show that the data structures Might is using are semirings and his parser-combinator approach is actually just functors between semirings. Personally, I'm *thrilled* that I was able to do this in Haskell, writing code that is *not* from either paper to show that the two have signficant overlap. Even better, I was able to show a different category of complexity can be encompassed by the semiring properties from those in the *Play* paper.

## Semiring-as-a-trait in Rust

The first thing is that, in that last post, I discussed not having to implement a Semiring trait in Rust, because I could abstract it further using the `num_trait`

crate to define my zero and one, and the `std::ops`

trait to define multiplication and addition.

Unfortunately, that didn't hold. It worked fine when my values were primitives such as Boolean or Integer, but when I implemented Matt Might's sets of strings as a return value, the `std::ops`

implementations were insufficient. To work as an operation, Rust *requires* that the data must be bitwise copyable without loss of fidelity; unfortunately, bitwise copying of sets-of-strings doesn't work; the underlying implementation has much of its data distributed across the heap. So I had to implement the Semiring as a trait to exploit Rust references and get high-performance operations, and it worked just fine.

## You can write Haskell (poorly) in any language

At one point developing the Rigged Brzozowski in Haskell implementation, I was stuck on a hard-to-surface bug. That whole bit about how "If it compiles it's probably correct" Haskell superiority nonsense is nonsense; there are lots of little fiddly bits in this algorithm ("Is this a sum or product operation?" "Is the initializer one or zero?" "Is the precedence correct?" "Is this test on the left or right operand?") that can go wrong.

I ported the implementation to Python in order to litter it with print statements and watch it work. This was useful, and helped me track down the bug. I was able to port the working instance back to Haskell easily.

One thing to note is that the Python is rather... odd. There are the six regex operations that can be performed on a string which are both unique and finite. By using `namedtuple`

I was able to create the same structure as the Haskell `data`

or Rust `enum`

operation, and with clever use of Python's reflection capabilities I was likewise able to make Python do something like Haskell or Rust's pattern-matching, using dictionaries. The result is, to my eye, pleasing, but I've been told it's "not very Pythonic."

Easier to maintain, at any rate.

## Are we done here?

That's... really the twelve thousand dollar question now, isn't it? I've finished sections one and two; the third section is about adopting this framework to recursive regular expressions, which I'm already somewhat proficient in from working with Darais' Racket implementation. So there are a couple of different ways I could go about this:

### I could just keep plugging away

I could proceed as I have been, implementing:

- Heavyweights using Brzozowski in Haskell
- Heavyweights using Brzozowski in Rust
- Recursive Regular Expressions in Haskell
- Recursive Regular Expressions in Rust
- Recursive Brzozowski Regular Expressions

### I could show it works in C++

I could combine what I did with the Python implementation and my limited (very limited) C++ knowledge and try to port one of the Rigged Glushkov engines to C++. The state-of-the-art in C++ unicode support looks absolutely terrifying, though.

### I could add to the feature set: incremental regular expressions

One of the big changes I made in Rust was that, toward the end, I changed the input value from an `Iteratable`

to an `Iterator`

, thus simplifying the API. I want to do the same thing for the output, that is, I want the *receiver* to get not just a semiring containing a set, but to get instead an iterator that produces elements from the semiring as they're produced, in order. I want to create an incremental regular expression.

### I could add to the feature set: compile-time regular expressions

In the paper that started this whole thing, Owens, Reppy & Turon showed (Section 3.3) that Brzozowski's algorithm can produce static DFAs, and that high-performance compile-time regular expressions are possible. Combined with Rust's Procedural Macros and the iterator ideas above, this could lead to static regular expressions becoming a first-class data type next to the `container`

library.

### I could add to the feature set: compile-time *bitmapped* regular expressions

Fritz Henglein has a paper in which he discusses Bit Coded Regular Expressions, which look fairly adaptable. BCRE requires that you not have character classes in your regular expression library (no "\w+", no "{Number}", and no "." operator!), but in exchange what you get is an *insanely* fast regular expression matching algorithm that stores and outputs its results as a bitmap, which happens to make "I found X" vs "I found Y" incredibly cheap on modern hardware; the engine knows which bitmap corresponds to which sequence exactly. This speed is exactly what you need to analyze the terabytes of data that flow through a modern logging engine.

### I could add to the feature set: extended regular expressions

There are four other operations that are known to work with regular expressions: *Intersection* ("this AND that at the same time"), *Negation* ("NOT that"), *Interleaf* ("This AND that AND that, independent of order of appearance"), and *Cut* ("The biggest THIS"). The *Cut* operation can be fully simulated using the Semiring implementation for the "longest submatch" (which can be adapted to emulate *any* of the *Alternative* behaviors found in the while: longest, atomic longest, first match, last match). The *Interleaf* operator is useful for parsing declarative languages in which elements appear in any order (for example, HTML attributes), and *Intersection* plus *Negation* are already commonplace in engines like PCRE.

Unfortunately, these fall outside of the the Semiring implementation. That doesn't make them *bad*, I just don't have a good intellectual grasp on how to implement them in a way that has a solid theoretical foundation. Even worse, there's some evidence that Intersection plus Negation together create a parser that has some edge cases with gnarly performance penalties.

### I could abstract Brzozowki's algorithm into a finite state transducer

More abstractly, Brzozowski's algorithm can actually be abstracted (eek!) into a bidirectional scanner. In some ways, a regular expression is a set-membership function with a functor transforming the membership determinant into something more useful than `true`

-or-`false`

. If I'm reading the paper Clowns to the Left of Me, Jokers to the Right correctly (no promises), Conor McBride shows that you could start *anywhere* in an abstract syntax tree, and Brzozowski's algorithm (really, any regular expression algorithm, but Brzozowksi's seems easiest here, actually) could provide derivatives of the left and right parts of the tree, producing a new tree transformed according to a regular expression substitution rule on the old tree. Do this progressively enough, and you end up with a fully functional tree transformer, or a very powerful abstraction of a finite state transducer that's fully explicable in Church terms, rather than the Turing terms used in the Wikipedia article.

### I could finish Barre

Or I could just "go for it," and just start re-writing Barre with the knowledge I've picked up working on these. One of the big goals of Barre is to implement Adams & Darais' "Language of Languages," a superset of Kleene's base six regular expressions to make it easier to build primitive parsers, giving you the "strap" part of bootstrapping this implementation into a full-powered parser generator.

I just haven't decided which to do yet.