Theoretical Aspects of Lexical Analysis/Exercise 1

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< Theoretical Aspects of Lexical Analysis


Problem

Use Thompson's algorithm to build the NFA for the following regular expression. Build the corresponding DFA and minimize it.

  • (a|b)*

Solution

The non-deterministic finite automaton (NFA), built by applying Thompson's algorithm to the regular expression (a|b)* is the following:

NFA for (a|b)*
{{{2}}}

Applying the determination algorithm to the above NFA, the following determination table is obtained:

In α∈Σ move(In, α) ε-closure(move(In, α)) In+1 = ε-closure(move(In, α))
- - 0 0, 1, 2, 4, 7 0
0 a 3 1, 2, 3, 4, 6, 7 1
0 b 5 1, 2, 4, 5, 6, 7 2
1 a 3 1, 2, 3, 4, 6, 7 1
1 b 5 1, 2, 4, 5, 6, 7 2
2 a 3 1, 2, 3, 4, 6, 7 1
2 b 5 1, 2, 4, 5, 6, 7 2
Graphically, the DFA is represented as follows:

<dot-hack> digraph dfa { 

    { node [shape=circle style=invis] start }
 rankdir=LR; ratio=0.5
 node [shape=doublecircle,fixedsize=true,width=0.2,fontsize=10]; 0 1 2
 node [shape=circle,fixedsize=true,width=0.2,fontsize=10];
 start -> 0
 0 -> 1 [label="a"]
 0 -> 2 [label="b"]
 1 -> 1  [label="a"]
 1 -> 2  [label="b"]
 2 -> 1 [label="a"]
 2 -> 2 [label="b"]
 fontsize=10

} </dot-hack>

Given the minimization tree to the right, the final minimal DFA is: <dot-hack> digraph dfamin { 

    { node [shape=circle style=invis] start }
 rankdir=LR; ratio=0.5
 node [shape=doublecircle,fixedsize=true,width=0.4,fontsize=10]; 012
 node [shape=circle,fixedsize=true,width=0.2,fontsize=10];
 start -> 012
 012 -> 012 [label="a"]
 012 -> 012 [label="b"]
 fontsize=10
 /*label="DFA for (a|b)*"*/

} </dot-hack>

The minimization tree is as follows. As can be seen, the states are indistinguishable.

<dot-hack> digraph mintree { 

 node [shape=none,fixedsize=true,width=0.2,fontsize=10]
 " {0, 1, 2}" -> "{}" [label="NF",fontsize=10]
 " {0, 1, 2}" -> "{0, 1, 2}" [label="F",fontsize=10]
 "{0, 1, 2}" -> "{0, 1, 2} " [label="a,b",fontsize=10]
 fontsize=10
 /*label="Minimization tree"*/

} </dot-hack>

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