MU Automata Theory - May 2012 Exam Question Paper

MU Information Technology (Semester 4)
Automata Theory
May 2012

Total marks: --
Total time: --

INSTRUCTIONS
(1) Assume appropriate data and state your reasons
(2) Marks are given to the right of every question
(3) Draw neat diagrams wherever necessary

1 (a) State and Prove the pumping lemma for the regular grammar.

5 M

1 (b) Explain different types of techniques for Turing Machine Construction.

5 M

1 (c) Compare and Contrast Mealy Machine and Moore Machine

5 M

1 (d) Prove that it is undecidable whether context free grammar is ambiguous.

5 M

2 (a) Write a regular expression for the following languages:
i. The set of all the strings such that the number of 0's is odd.
ii. The set of all the strings that do not contain 1101

10 M

2 (b) Convert the following NFA to DFA P is the initial state r and s it the final state.

δ	0	1
→ p	{p,r}	{q}
q	{r,s}	{p}
r*	{p,s}	{r}
s*	{q,r}	{}

10 M

3 (a) Show that every regular language is a context free language.
HINT: Construct a CFG by induction on the number of operators in the regular expression.

10 M

3 (b) A palindrome is a string that equals its own reverse, such as 0110 or 1011101. Use pumping lemma to show that set of palindromes is not regular language.

10 M

4 (a) Design a PDA to accept each of the following languages
i. {0ⁿ1^m0ⁿ | m,n≥1}
ii. {0ⁿ1^m0^m0ⁿ | m,n≥1}

10 M

4 (b) Convert the grammar
s->0AA
A->0S|1S|0
to a PDA that accept same language by empty stack.

10 M

10 M

5 (b) Prove that L={aⁿ | n is prime} is not context free.

10 M

6 (a) Design Turning Machine for the following language.
"set of all strings of balanced parenthesis"

10 M

6 (b) Convert the following grammar to Gribach normal form
S→AB1|0
A→00A|B
B→|A|

10 M

7 (a) Myhill-Nerode theorem.

5 M

7 (b) Post Correspondence Problem.

5 M

7 (c) Universal Turning Machine.

5 M

7 (d) The Classes P and NP.

5 M

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