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The regular expression is (a+)+ . Using an NFA this would give reDOS attacks for longer strings . What would be the equivalent grammar for this regular expression ?

Now i was trying to determine the grammar in multiple steps .

a+ would translate to

S -> a

S -> aS

(a+)+ would translate to

G -> S

G -> SG

I was not sure how to simplify further whether it would be CFG or CSG ? Any suggestions would be of great help

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1 Answer 1

up vote 1 down vote accepted

(a+)+ is equivalent to a+. A possible grammar is

  • S → A
  • A → a
  • A → aA

The grammar is regular (such one must exist, because it's derived from a regular expression). It's therefore also context-free and therefore also context-sensitive.

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does this mean any regular expression would result in regular grammar ? –  sashank Oct 28 '13 at 2:46
    
Yes. Regular expressions, regular grammars and finite automata are equivalent. –  Oswald Oct 28 '13 at 21:42
    
I guess you are talking about "pure" regular expressions but not the ones as in PCRE . nikic.github.io/2012/06/15/… –  sashank Oct 29 '13 at 15:43
    
You guessed correctly. –  Oswald Oct 29 '13 at 20:34

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