I was reading this article today on two different regular expression algorithms.

According to the article old Unix tools like ed, sed, grep, egrep, awk, and lex, all use what's called the Thompson NFA algorithm in their regular expresssions...

However newer tools like Java, Perl, PHP, and Python all use a different algorithm for their regular expressions that are much, much slower.

This article makes no mention at all of Javascript's regex algorthim, (and yes I know there are various JS engines out there) but I was wondering if anybody knew which of those algorithms they use, and if maybe those algorithms should be swapped out for Thompson NFA.


The Javascript ECMA language description doesn't impose a requirement for the particular implementation of regular expressions, so that part of the question isn't well-formed. You're really wondering about the particular implementation in a particular browser.

The reason Perl/Python etc use a slower algorithm, though, is that the regex language defined isn't really regular expressions. A real regular expression can be expressed as a finite state machine, but the language of regex is context free. That's why the fashion is to just call it "regex" instead of talking about regular expressions.


Yes, in fact javascript regex isn't content free regular. Consider the syntax using `{n,m}', that is, matches from n to m accepted regexs. Let d the difference d=|n-m|. The syntax means there exists a string uxdw that is acceptable, but a string uxk>dw that is not. It follows via the pumping lemma for regular languages that this is not a regular language.

(augh. Thinko corrected.)

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    Actually, they're more than full regular expressions. "{n,m}", for example, can't be represented in an FSA for arbitrary n,m. – Charlie Martin Apr 7 '09 at 21:51
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    Your "update" about {n,m} is wrong. x{3,5} can be written as xxx|xxxx|xxxxx which is perfectly regular and handled perfectly well with a DFA engine. – Jan Goyvaerts Apr 8 '09 at 9:41
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    The unbounded x{3,} can be rewritten as xxxx* which is regular and can be implemented with a DFA with 4 states. Try it at osteele.com/tools/reanimator – Jan Goyvaerts Apr 10 '09 at 6:38
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    You’re correct that JavaScript regular expressions aren’t regular, but the {n,m} syntax isn’t the reason for nor proof of that. The problem is that you’re misusing the pumping lemma. Consider the regular language {a}. It only matches a. It follows from the same misuse in your answer that it’s not a regular language. The key is that strings uxⁿw in the language having n at least some finite number (the pumping length) can be pumped in a regular language – not just any string. – Ry- Nov 30 '15 at 4:26
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    @Bamieh: JavaScript regex aren’t regular – they support backreferences. (a+)b\1 can’t be represented by an NFA. – Ry- Oct 11 '17 at 8:56

Though the ECMA standard does not specify the algorithm an ECMAScript implementation should use, the fact that the standard mandates that ECMAScript regular expressions must support backreferences (\1, \2, etc.) rules out the DFA and "Thompson NFA" implementations.

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    Backreferences rule out DFA (deterministic finite automaton), but there are other ways to solve the problem (e.g. recursive backtracking). Perl uses memoized backtracking recursion which removes a lot of the downsides to recursive backtracking (still eats a lot of memory on certain patterns though). – Chas. Owens Apr 8 '09 at 11:56
  • Also, one easy optimization would be just to check first if the regexp was a 'real' regular expression first and only use the slower algorithm if not. This is pretty obvious but I'm hoping to get a response as to whether the browser implementations actually do something like this. – Peter Gerdes Jun 4 '20 at 10:54

Perl uses a memoized recursive backtracking search and, as of some improvements in 5.10, no longer blows up on perl -e '("a" x 100000) =~ /^(ab?)*$/;'. In recent tests I performed on an OS X box, Perl 5.10 outperformed awk, even in the cases where awk's algorithm was supposed to be better.


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