Theoretical Aspects of Lexical Analysis/Exercise 2: Difference between revisions

Revision as of 00:08, 22 March 2009

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

(a*|b*)*

Solution

NFA

The following is the result of applying Thompson's algorithm.

<graph> digraph nfa {

    { node [shape=circle style=invis] start }
 rankdir=LR; ratio=0.5
 node [shape=doublecircle,fixedsize=true,width=0.2,fontsize=10]; 11
 node [shape=circle,fixedsize=true,width=0.2,fontsize=10];
 start -> 0
 0 -> 1; 0 -> 11 
 1 -> 2; 1 -> 6
 2 -> 3; 2 -> 5
 3 -> 4 [label="a",fontsize=10]
 4 -> 3; 4 -> 5
 5 -> 10
 6 -> 7; 6 -> 9
 7 -> 8 [label="b",fontsize=10]
 8 -> 7; 8 -> 9
 9 -> 10
 10 -> 1; 10 -> 11
 fontsize=10
 //label="NFA for (a*|b*)*"

} </graph>

DFA

Determination table for the above NFA:

I_n	α∈Σ	move(I_n, α)	ε-closure(move(I_n, α))	I_n+1 = ε-closure(move(I_n, α))
-	-	0	0, 1, 2, 3, 5, 6, 7, 9, 10, 11	0
0	a	4	1, 2, 3, 4, 5, 6, 7, 9, 10, 11	1
0	b	8	1, 2, 3, 5, 6, 7, 8, 9, 10, 11	2
1	a	4	1, 2, 3, 4, 5, 6, 7, 9, 10, 11	1
1	b	8	1, 2, 3, 5, 6, 7, 8, 9, 10, 11	2
2	a	4	1, 2, 3, 4, 5, 6, 7, 9, 10, 11	1
2	b	8	1, 2, 3, 5, 6, 7, 8, 9, 10, 11	2

Graphically, the DFA is represented as follows:

<graph> 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
 //label="DFA for (a|b)*"

} </graph>

Given the minimization tree to the right, the final minimal DFA is: <graph> 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)*"

} </graph>

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

<graph> 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"

} </graph>

Theoretical Aspects of Lexical Analysis/Exercise 2: Difference between revisions

From Wiki**3

< Theoretical Aspects of Lexical Analysis

Revision as of 00:08, 22 March 2009

Solution

NFA

DFA

@@ Line 4: / Line 4: @@
 == Solution ==
+=== NFA ===
+The following is the result of applying Thompson's algorithm.
+<graph>
+digraph nfa {
+     { node [shape=circle style=invis] start }
+  rankdir=LR; ratio=0.5
+  node [shape=doublecircle,fixedsize=true,width=0.2,fontsize=10]; 11
+  node [shape=circle,fixedsize=true,width=0.2,fontsize=10];
+  start -> 0
+-> 1; 0 -> 11
+-> 2; 1 -> 6
+-> 3; 2 -> 5
+-> 4 [label="a",fontsize=10]
+-> 3; 4 -> 5
+-> 10
+-> 7; 6 -> 9
+-> 8 [label="b",fontsize=10]
+-> 7; 8 -> 9
+-> 10
+-> 1; 10 -> 11
+  fontsize=10
+  //label="NFA for (a*|b*)*"
+}
+</graph>
+=== DFA ===
+Determination table for the above NFA:
+{| cellspacing="2"
+! style="padding-left: 20px; padding-right: 20px; background: wheat;" | I<sub>n</sub>
+! style="padding-left: 20px; padding-right: 20px; background: wheat;" | α∈Σ
+! style="padding-left: 20px; padding-right: 20px; background: wheat;" | move(I<sub>n</sub>, α)
+! style="padding-left: 20px; padding-right: 20px; background: wheat;" | ε-closure(move(I<sub>n</sub>, α))
+! style="padding-left: 20px; padding-right: 20px; background: wheat;" | I<sub>n+1</sub> = ε-closure(move(I<sub>n</sub>, α))
+|-
+! style="font-weight: normal; align: center; background: #ffffcc;" | -
+! style="font-weight: normal; align: center; background: #ffffcc;" | -
+! style="font-weight: normal; align: center; background: #ffffcc;" | 0
+! style="font-weight: normal; align: left;   background: #ffffcc;" | 0, 1, 2, 3, 5, 6, 7, 9, 10, '''11'''
+! style="font-weight: normal; align: center; background: #ffffcc;" | '''0'''
+|-
+! style="font-weight: normal; align: center; background: #e6e6e6;" | 0
+! style="font-weight: normal; align: center; background: #e6e6e6;" | a
+! style="font-weight: normal; align: center; background: #e6e6e6;" | 4
+! style="font-weight: normal; align: left;   background: #e6e6e6;" | 1, 2, 3, 4, 5, 6, 7, 9, 10, '''11'''
+! style="font-weight: normal; align: center; background: #e6e6e6;" | '''1'''
+|-
+! style="font-weight: normal; align: center; background: #e6e6e6;" | 0
+! style="font-weight: normal; align: center; background: #e6e6e6;" | b
+! style="font-weight: normal; align: center; background: #e6e6e6;" | 8
+! style="font-weight: normal; align: left;   background: #e6e6e6;" | 1, 2, 3, 5, 6, 7, 8, 9, 10, '''11'''
+! style="font-weight: normal; align: center; background: #e6e6e6;" | '''2'''
+|-
+! style="font-weight: normal; align: center; background: #ffffcc;" | 1
+! style="font-weight: normal; align: center; background: #ffffcc;" | a
+! style="font-weight: normal; align: center; background: #ffffcc;" | 4
+! style="font-weight: normal; align: left;   background: #ffffcc;" | 1, 2, 3, 4, 5, 6, 7, 9, 10, '''11'''
+! style="font-weight: normal; align: center; background: #ffffcc;" | '''1'''
+|-
+! style="font-weight: normal; align: center; background: #ffffcc;" | 1
+! style="font-weight: normal; align: center; background: #ffffcc;" | b
+! style="font-weight: normal; align: center; background: #ffffcc;" | 8
+! style="font-weight: normal; align: left;   background: #ffffcc;" | 1, 2, 3, 5, 6, 7, 8, 9, 10, '''11'''
+! style="font-weight: normal; align: center; background: #ffffcc;" | '''2'''
+|-
+! style="font-weight: normal; align: center; background: #e6e6e6;" | 2
+! style="font-weight: normal; align: center; background: #e6e6e6;" | a
+! style="font-weight: normal; align: center; background: #e6e6e6;" | 4
+! style="font-weight: normal; align: left;   background: #e6e6e6;" | 1, 2, 3, 4, 5, 6, 7, 9, 10, '''11'''
+! style="font-weight: normal; align: center; background: #e6e6e6;" | '''1'''
+|-
+! style="font-weight: normal; align: center; background: #e6e6e6;" | 2
+! style="font-weight: normal; align: center; background: #e6e6e6;" | b
+! style="font-weight: normal; align: center; background: #e6e6e6;" | 8
+! style="font-weight: normal; align: left;   background: #e6e6e6;" | 1, 2, 3, 5, 6, 7, 8, 9, 10, '''11'''
+! style="font-weight: normal; align: center; background: #e6e6e6;" | '''2'''
+|}
+{| width="100%"
+! style="text-align: left; font-weight:normal; vertical-align: top; width: 50%;" |Graphically, the DFA is represented as follows:
+<graph>
+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
+-> 1 [label="a"]
+-> 2 [label="b"]
+-> 1  [label="a"]
+-> 2  [label="b"]
+-> 1 [label="a"]
+-> 2 [label="b"]
+  fontsize=10
+  //label="DFA for (a|b)*"
+}
+</graph>
+Given the minimization tree to the right, the final minimal DFA is:
+<graph>
+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 [label="a"]
+-> 012 [label="b"]
+  fontsize=10
+  //label="DFA for (a|b)*"
+}
+</graph>
+! style="text-align: left; font-weight:normal; vertical-align: top; width: 50%;" | The minimization tree is as follows. As can be seen, the states are indistinguishable.
+<graph>
+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"
+}
+</graph>
+|}
 [[category:Teaching]]
 [[category:Compilers]]
 [[en:Theoretical Aspects of Lexical Analysis]]