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What grammars are not context free? Please give me examples that are not context free.

Is this grammar context free?

A->aSb|aaS|aaaS|B
S->aSb|Bb|lambda
B->Bb|lambda
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closed as off-topic by Greg Hewgill, Barmar, Juhana, Frédéric Hamidi, Yenne Info Mar 7 '14 at 9:09

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This question appears to be off-topic because it is about computer science, not programming. Try cs.stackexchange.com or cstheory.stackexchange.com. –  Barmar Dec 31 '13 at 9:01
    
@Barmar: You may have just stated the most ridiculous sentence of all time on StackOverflow. –  Mehrdad Dec 31 '13 at 9:02
1  
Not really. CS and programming are related, like architecture and building construction. –  Barmar Dec 31 '13 at 9:04
1  
@Barmar context-free grammar is tagged , this tag isnt for CS? –  N_93 Dec 31 '13 at 9:16

1 Answer 1

up vote 3 down vote accepted

The grammar is context-free, because there's no context around the left-hand side. See below.

Assuming:

  • The Greek letters like α, β, and γ are arbitrary productions
  • Uppercase letters like X and Y are nonterminal symbols
  • Lowercase letters like z are terminal symbols
  • ε is the special empty production

We have the following definitions:

  1. Regular grammars are those whose rules can be written in the forms:

    X: z Y
    X: z
    X: ε
    

    For example:

    Digits: '0' Digits
    Digits: '1' Digits
    Digits: '2' Digits
    ...
    Digits: '9' Digits
    Digits: ε
    
  2. Context-free grammars are those whose rules can be written in the form:

    X: α
    

    In other words, only single nonterminals can be transformed at a time, independently of what might surround them.

    For example:

    Expression: AdditiveExpression
    AdditiveExpression: AdditiveExpression '+' MultiplicativeExpression
    AdditiveExpression: AdditiveExpression '-' MultiplicativeExpression
    AdditiveExpression: MultiplicativeExpression
    MultiplicativeExpression: MultiplicativeExpression '*' PrimaryExpression
    MultiplicativeExpression: MultiplicativeExpression '/' PrimaryExpression
    MultiplicativeExpression: PrimaryExpression
    PrimaryExpression: Number
    PrimaryExpression: '(' Expression ')'
    
  3. Context-sensitive grammars are those whose rules can be written in the form:

    αXγ: αβγ
    

    In other words, the context around X can help you decide that X should be transformed into β, but the context itself does not become transformed.

    For example:

    Expression: 'x' Foo 'y'
    'x' Foo 'y': 'x' Bar 'y'
    Bar: 'z'
    

    A more realistic example that shows why this is useful can be found on Math.StackExchange.

  4. Unrestricted grammars are those whose rules can be written in the form:

    αXγ: β
    

    In other words, any sequence of symbols containing a nonterminal can be manipulated into any other sequence of symbols. Basically, this represents arbitrary manipulation of memory, or Turing-completeness.

    For example:

    Expression: 'x' Foo 'y'
    'x' Foo 'y': 'z'
    

    You never see these in practice.

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show me one grammar isn't context free please. –  N_93 Dec 31 '13 at 9:29
    
@Nastaran: I've done that, maybe you didn't refresh after I wrote it? It's under "For example" in #3. –  Mehrdad Dec 31 '13 at 9:30
    
Yes I See now, thank u . –  N_93 Dec 31 '13 at 9:34
    
"You never see these in practice." One does, in fact, see them occasionally, but usually they're just called rewrite rules or something similar, and not referred to as grammars. –  ibid Jan 7 '14 at 11:40

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