# regex - What is the complexity of this regular expression for primes detect?

This line of ruby code detects prime numbers (awesome!).

``````("1" * n) !~ /^1?\$|^(11+?)\1+\$/   # where n is a positive integer
``````

The detail is explained in this blog post http://www.noulakaz.net/weblog/2007/03/18/a-regular-expression-to-check-for-prime-numbers/

I'm curious about it's performance in the manner of BIG-O notation. Anyone help?

• The blog comments talk about performance already and how it begins to suffer terribly at even slightly large numbers. This comment seems apt: `"So a 32 bit number 2147483648 would take up half a gig of memory"` Commented Jun 19, 2013 at 8:07
• As far as it is a really clever use of regular expressions, it is, complexity-wise, incredibly worse than using just the most trivial algorithms for prime numbers! Commented Jun 19, 2013 at 9:09
• anyway, I would like to see the FSM generated by that regex. It seems to me that it would be O(N) where N is the magnitude of the number, while other algorithms are usually O(sqrt(N)) IIRC. Not to mention it is O(N) space-wise too, which makes it not viable for big Ns. (Obviously it's O(N) space-wise in ruby, because one could implement a Range in C++ that would be matchable to the regex, but wouldn't occupy N bytes '1') :-D Commented Jun 19, 2013 at 10:52
• This doesn't work when n=1, which is a prime number. Commented Nov 24, 2013 at 9:58

The blue dots are the recorded times and the orange line is `y = 2.9e-9 * x^2`. The line fits the data perfectly, indicating that the complexity is O(n2).