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Lecture #5 Advanced Computation Theory Finite Automata.

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1 Lecture #5 Advanced Computation Theory Finite Automata

2 some properties on Theorem 1: For any state q Є Q and any symbol a Є Σ for a dfa M = (Σ, Q, q, δ, A), proof since, then By definition of, Also by definition

3 hence # Theorem 2: For any state q of Q and any string x and y over Σ for a dfa M = (Σ, Q, q, δ, A), Proof: it is going to be proven by induction on string y. that is the statement to be proven is For any arbitrary fixed string x is true for any y

4 now, Let us recall, *.*. and for, and, then if, then also Hence the theorem is true for By the definition of

5 assume is true for any arbitrary string y. we are going to prove that: is true for any arbitrary string a of Σ. By the definition of Thus the theorem has proven

6 fa can be found in different forms such as dfa: Deterministic Finite Automata, DFA nfa: Nondeterministic Finite Automata, NFA pfa: Pushdown Finite Automata, PDA

7 dfa Deterministic Finite Automata

8 Languages & dfa

9 Definition: for a given dfa (M), the language of M, denoted by L(M), is the set of all string that will be accept by M. A language L consider to be a regular language if there exist a dfa that accept that language, i.e. for any dfa there is a regular language L that recongize by such dfa

10 Example #1 Show whether L regular language or not? solution Given the language, L = {a 2n + 1 | n >= 0} if there is any dfa that recognizes/accepts L, then L is regular language.

11 Initially, M will be at the start state q 0 Once M encountered the first symbol is a, it will transit to state q 1 If no more input symbol the M will stay in state q 1 and that is the final state, since n >= 0.

12 If another symbol a is encountered then M will move to state q 0 One more symbol is a, should be there so as to make M, transits to state q1(accept state), since a 2n + 1 and n >= 0

13 Based on the above discussion, the dfa can be represented by transition diagram as follows q1q1 a q0q0 a Therefore, the dfa, M as model can be shown as:

14 Example #2 Prove that the language is regular

15 Is there any a dfa, M to show that the language is regular? Here the M, check whether the string begins with and ends with a, what is in between is immaterial. M goes into the final state whenever the second a is encountered. solution

16 If this isn’t the end of string, and another b is found, it will take the dfa out of the final state. Scanning out and each a takes the dfa into the final state. At initial state, if b is encountered then M moves to a trap state. Accordingly, the dfa, M as model can be shown as:

17 q0q0 q2q2 q3q3 a b a b q1q1 a, b b a The dfa, state diagram is shown in the following Figure.

18 Example #3 Find the dfa that recognizes/accepts the language, L that consists of set of all strings on starting with the prefix ba

19 The main issue here, the first two symbols (ba) in the string; after they have been read, no further decision need to be made. Therefore the dfa, M can be designed used only four states, initial state, two state to recognize ba ending in a final trap state, and one non-final trap state. solution

20 If the first symbol is b and the second symbol is a a, M goes to the final trap state, and it will remain there since the rest of the string doesn't matter. On the other hand if the first symbol isn’t a b, and the second symbol isn’t an a, M goes to the non- final trap state Therefore, the dfa, M as model can be shown as:

21 q0q0 q2q2 q3q3 b a a, b a b q1q1 The simple solution is shown as in the following Figure

22 Example #4 Find the dfa that recognize/accept the set of all languages on, where

23 Initially, M will be at the start state q 0 Once M encountered the first symbol is a, it will transit to state q 1 If M encountered b at state q 1 it moves to state q 2. M may stay in q 0 as an accepting state since ɛ L(M).

24 If no more input another symbol M will stay at state q 2 as an accepting state since ab L(M). At q 2, If M encounter b it moves to state q 3. If M encountered a at state q 3 it moves to state q 4 as an accept state.

25 If no more input symbol M will stay at state q 4 as an accepting state since abba L(M). If M encounter b at q 0 or q 3, a at q 1 or q 2, or a, b at q 4, it moves to state q 5 as trap state. At q 5 for input symbols a and b, M stays at q 5, since it is a trap state. Based on the above discussion, the dfa, M as model can be shown as:

26 q0q0 q2q2 q3q3 a b b a q1q1 a, b b q4q4 a q5q5 a b Then dfa transition diagram can be shown as


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