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1 Module 18 NFA’s –nondeterministic transition functions computations are trees, not paths –L(M) and LNFA LFSA subset of LNFA –Comparing computational models
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2 Nondeterministic Finite State Automata NFA’s
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3 Change: is a relation For an FSA M, (q,a) results in one and only one state for all states q and characters a. –That is, is a function For an NFA M, (q,a) can result in a set of states –That is, is now a relation –Next step is not determined (nondeterministic)
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4 Example NFA aaab a,b Why is this only an NFA and not an FSA? Identify as many reasons as you can.
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5 Computing with NFA’s Configurations: same as they are for FSA’s Computations are different –Initial configuration is identical –However, there may be several next configurations or there may be none. Computation is no longer a “path” but is now a “graph” (often a tree) rooted at the initial configuration –Definition of halting, accepting, and rejecting configurations is identical –Definition of acceptance must be modified
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6 Computation Graph (Tree) aaab a,b Input string aaaaba (1, aaaaba) (1, aaaba)(2, aaaba) (1, aaba)(2, aaba)(3, aaba)(1, aba)(2, aba)(3, aba)crash(1, ba)(2, ba)(3, ba) (1, a)(4, a) (1, )(2, )(5, )
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7 Definition of |- unchanged * aaab a,b Input string aaaaba (1, aaaaba) |- (1, aaaba) (1, aaaaba) |- (2, aaaba) (1, aaaaba) |- 3 (1, aba) (1, aaaaba) |- 3 (3, aba) (1, aaaaba) |- * (2, aba) (1, aaaaba) |- * (3, aba) (1, aaaaba) |- * (1, ) (1, aaaaba) |- * (5, ) (1, aaaaba) (1, aaaba)(2, aaaba) (1, aaba)(2, aaba)(3, aaba) (1, aba)(2, aba)(3, aba)crash (1, ba)(2, ba)(3, ba) (1, a)(4, a) (1, )(2, )(5, )
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8 Acceptance and Rejection * aaab a,b Input string aaaaba M accepts string x if one of the configurations reached is an accepting configuration (q 0, x) |- * (f, ),f in A M rejects string x if all configurations reached are either not halting configurations or are rejecting configurations (1, aaaaba) (1, aaaba)(2, aaaba) (1, aaba)(2, aaba)(3, aaba) (1, aba)(2, aba)(3, aba)crash (1, ba)(2, ba)(3, ba) (1, a)(4, a) (1, )(2, )(5, )
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9 Comparison aaa a,b b b b b a FSA aaab a,b NFA
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10 Defining L(M) and LNFA M accepts string x if one of the configurations reached is an accepting configuration –(q 0, x) |- * (f, ),f in A M rejects string x if all configurations reached are either not halting configurations or are rejecting configurations L(M) (or Y(M)) –The set of strings accepted by M N(M) –The set of strings rejected by M LNFA –Language L is in language class LNFA iff there exists an NFA M such that L(M) = L
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11 Comparing language classes LFSA subset of LNFA
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12 LFSA subset LNFA Let L be an arbitrary language in LFSA Let M be the FSA such that L(M) = L –M exists by definition of L in LFSA Construct an NFA M’ such that L(M’) = L Argue L(M’) = L There exists an NFA M’ such that L(M’) = L L is in LNFA –By definition of L in LNFA
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13 Visualization LFSA LNFA FSA’s NFA’s L L M M’ Let L be an arbitrary language in LFSA Let M be an FSA such that L(M) = L M exists by definition of L in LFSA Construct NFA M’ from FSA M Argue L(M’) = L There exists an NFA M’ such that L(M’) = L L is in LNFA
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14 Construction We need to make M into an NFA M’ such that L(M’) = L(M) How do we accomplish this?
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