1. Introduction to the Theory of Computation John Paxton Montana State University Summer 2003

2. Humor A foreign visitor was being given a tour of Washington, D.C. one day by an American friend of hers. She was amazed at the size of the Monuments, the Congressional Buildings, and so forth. Finally she gazed upon the White House itself. "My, that's an incredibly large building!" she remarked. "Yes, it's pretty big, alright." said her friend. "Big? It's huge!! About how many people work in there?" she asked. "Oh... about half."

3. Chapter 2: Context-Free Languages Applications: Capture most human language syntax, programming language syntax, the parser in a compiler More powerful model of computation

4. 2.1 Context-Free Grammars A grammar consists of –production rules –variables –terminals –a starting variable A => 0A1 | #

5. Derivation A => 0A1 => 00A11 => 00#11

6. Parse Tree A 0 A 1 #

7. Natural Language => => | => => a | the => boy | girl => runs | plays

8. Context Free Grammar Definition A CFG is a 4-tuple (V, , R, S) where 1.V is a finite set called the variables 2.  is a finite set, disjoint from V, called the terminals 3.R is a finite set of rules, with each rule being a variable and a string of variables and terminals 4.S is the start symbol

9. Exercise Identify (V, , R, S) for A => 0A1 | # Describe the language

10. More Definitions uAv yields uwv if A => w is a rule uAv =>* uwv if a sequence of 1 or more steps exist such that A => w The language of the grammer is { w   * | S =>* w }

11. Another Grammar => + | => x | => ( ) | a Exercise: Parse tree for a + a x a Exercise: Parse tree for (a + a) x a

12. Exercises Design a context free grammar for the language {0 n 1 n | n >= 0} U {1 n 0 n | n >= 0} Design a context free grammar for the below NFA 1 0 

13. Exercises Give a CFG that generates the language {w | w contains at least three 1s} over the alphabet {0,1}. Repeat the above question for {w | w contains more 1s than 0s} Repeat the above question for {w | w contains twice as many a’s as b’s} over the alphabet {a, b}

14. Ambiguity => + | x | a A string w is derived ambiguously in a CFG if it has two or more different leftmost derivations. A CFG is ambiguous if it generates some string ambiguously. Exercise: Show a + a x a is ambiguous.

15. Chomsky Normal Form All rules are in one of the following forms: 1.S =>  is allowed (S is the start symbol) 2.A => B C (B and C aren’t S) 3.A => a

16. Theorem Any context-free language is generated by a context-free grammar in Chomsky normal form.

17. Proof Add new start symbol S 0 Add S 0 => S Eliminate an  rule, adjust other rules. Repeat above step until all  rules eliminated except for possible S 0 =>  Example: A => , B => aAaAa becomes B => aAaAa | aaAa | aAaa

18. Proof Remove a unit rule A => B. Example: A => B, C => AA becomes C => BB Repeat until all unit rules removed.

19. Proof Convert all remaining rules into proper form. Example: A => aBcD becomes A => U 1 U 2 U 1 => a U 2 => BU 3 U 3 => U 4 D U 4 => c

20. Example S => ASA | b |  A => a S 0 => S (add new start rule) S => ASA | b |  A => a

21. Example S 0 => S |  S => AA | ASA | b (eliminate S =>  ) A => a S 0 => AA | ASA | b |  (eliminate S 0 => S) S => AA | ASA | b A => a

22. Example S 0 => AA | AU 1 | b |  (change S 0 => ASA) S => AA | AU 1 | b (change S => ASA) A => a U1 => SA

23. Exercise Convert the following grammar to Chomsky Normal Form: A => BAB | B |  B -> 00 | 