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I have to decide for several languages whether they are regular, context-free, det. context-free or type-0. I understand how to show a language not to be regular (using the pumping lemma), but how to decide it for the other language types very fast? The first language is

{a,b,c}* \ {a^n b^n c^n | n is element of natural numbers}

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  • "I understand how to show a language to be regular (using the pumping lemma)" -- NO Pumping lemma doesn't shows that a language is a regular language. Pumping lemma shows that a language is not a regular language. Pumping lemma is necessary but not a sufficient property for regular language.
    – Grijesh Chauhan
    Mar 4, 2015 at 6:54
  • Thanks for your comment. It was a wording mistake, of course the pumping lemma shows that a language is not regular. Do you have a solution for my whole problem?
    – jannnik
    Mar 5, 2015 at 11:29
  • I think you need something like language -- [ tool ] --> 'type of language' ??
    – Grijesh Chauhan
    Mar 5, 2015 at 11:43
  • Yes, but I have to find out the language type by hand in an exam. The questions are possibly multiple choice.
    – jannnik
    Mar 5, 2015 at 12:09
  • yes, that is what for this whole subject is - classification of formal languages - theory of formal language. check this.
    – Grijesh Chauhan
    Mar 5, 2015 at 12:21
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