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I have a paper that states:

(...) languajes such as strings of x's followed by the same number of y's (for example xxxxyyyy) cannot be specified by a regular grammar or Finite States Automaton because these devices have no mechanism for remembering how many x's were generated when the time comes to derive the y's. This shortcoming is remedied by means of rules such as S → xSy, which always generate an x and a y at the same time. (...)

So, I don't understand this statement, as far as I know, such strings can be generated with the regular grammar with production rules:

S → xS

S → yS

S → y

Where x,y are terminals, S is the starting unique non terminal. This grammar produces the derivation

S→xS→xxS→xxxS→xxxxS→xxxxyS→xxxxyyS→xxxxyyyS→xxxxyyyy

  • Its easy to generate it on paper, but how machine will know how many ys to generate? – Priyesh Kumar Apr 29 '17 at 14:28
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Grammar must generate every string in language, and no strings not in language.

Your grammar also generates invalid string y with the third production, or xxy, or xyxy, hence you can NOT say this is a grammar for your language.

  • Ok, so the languaje consists only of strings in the form stated. – D1X Apr 29 '17 at 15:17

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