# Finding a complement of a regular language

Could you help me please to find a complement of a language, which ends with abab - (a|b)*abab (over an alphabet {a,b})

I guess, the complement must contain all string, that don't end with abab. One can try to do it with Rij-Algorithm after building a DFA for complement of (a|b)*abab, but pleaseee, help me to understand how it works without Automaton and Rij (because that Automaton has 5 states).

Ok, the words are not allowed to end with abab. There are 2^4 ways for four letters of a's and b's at the end. Okay, abab must be erased so there are 15 combinations. Does it mean, that the complement-language is (a|b)*.(union of all those combinations of a's and b's without abab)? But does (a|b) still stay the same at the beginning?

Help me please to understand this.

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Maybe I quiet don't understand you, but isn't it much simplier. I'e `(a|b)*(a|bb|aab|bbab)` or event `(a|b)*(a|(b|(a|bb)a)b)`?
P.S. Don't forget that there is words shorter than `abab` and all of them should be included too. I.e. `(a|b){0,3}` (where `{0,3}` denotes amount of repeats [0; 3])
Yes. Since we have anchoring to the end of word its enough to make that last part of word incompatible. So starting from last letter I start to iterate and at each step I go in two sets: mismatch - means you can have anything else right after it; match - you should have mismatch at further steps. About last question I wouldn't be so sure. Consider complement language for `(a|b)*abab(a|b)*` - the only place where those `(a|b)*` will be allowed is for describing words with length shorter than 4. Other probably would contain single letter under star operator. –  ony Nov 21 '11 at 6:31