Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I'm pretty sure I've actually got one, but it has 42 construction rules and doesn't generalize well. How can I do it with fewer construction rules?

The language is {a,b}* where the number of a's is five times the number of b's.

I know that for a language {a^n (concatenate) b^m; m = 5n} it would just be

S = aSbbbbb | λ

But when the characters can be in any order, I'm lost.

share|improve this question
Do you have evidence that it is possible to express the grammar with a few rules? –  Simeon Visser Mar 21 '12 at 18:46

1 Answer 1

up vote 4 down vote accepted

First of all, observe that if a sentence has 5 times as many characters as the other, it'll always look something like aaabaabaaaaa. So one sentence can be aaaaab or aaabaa. Another observation is that whenever we add a b, we must add five a characters.

The following grammar indeed has five times as many a characters as b characters:

S = AS | λ
A = Baaaaa | aBaaaa | aaBaaa | aaaBaa | aaaaBa | aaaaaB
B = bS | Sb

We start with S which can either by empty (which satisfies the requirement) or A.

The rule for A produces at least 5 a characters and a B. Now for B, we can either place b and stop there (by choosing the empty string for S) or by starting again (by choosing A for S). This guarantees that we're always placing 5 times as many a characters as b characters.

Lastly, this grammar can easily be generalized to a grammar than needs to contain n times as many characters of one as the other (by straightforwardly extending rule A).

share|improve this answer
I don't know what you just said, but you used a character I don't know how to do with a keyboard, so it must be right. +1 ;) –  hvgotcodes Mar 21 '12 at 19:32
Thanks for the answer! But I am not sure that this is correct. I can not figure out a way to derive, for example, baaaaaaaaaab from those rules. My apologies if I am overlooking something. Can you see a way to derive baaaaaaaaaab? It seems only possible to get a b on one end of the string. –  Aurast Mar 21 '12 at 20:04
You're right, I couldn't find a way to derive either baaaaaaaaaab. I've adjusted the rule for S to make it possible: S = AS = AAS = AA = BaaaaaA = BaaaaaaaaaaB = bSaaaaaaaaaaB = bSaaaaaaaaaabS = bSaaaaaaaaaab = baaaaaaaaaab. –  Simeon Visser Mar 21 '12 at 20:15
Beautiful, I think it works. Thanks! Don't think I ever could have come up with that >.< –  Aurast Mar 21 '12 at 20:32

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.