1.正规式转换到正规文法
对任意正规式R选择一个非终结符Z生成规则Z→R
1.对形如A→ab的规则,转换成A→aB,B→b
2.将形如A→a|b的规则,转换成A→a,A→b(A→a|b)
3.将形如A→a*b的规则,转换成A→aA,A→b
将形如A→ba*的规则,转换成A→Aa,A→b
不断利用上述规则进行转换,直到每条规则最多含有一个终结符为止.
1(0|1)*101
(1)S → A1
A → B0
B → C1
C → 1(0 | 1)* → 1 | C0 | C1
(a|b)*(aa|bb)(a|b)*
(2)S → (a | b)S
S → (aa | bb)(a | b)*
S → S(a | b)
— S → aa | bb
— S → aS | bS | Sa | Sb | aA | bB
A → a
B → b
((0|1)*|(11))*
(3)S → ε | ((0 | 1)* | (11))S
→ ε | ((0 | 1)*S | (11)S)
→ ε | ((0 | 1)S | (11)S)
→ ε | 0S | 1S | 1A
A → 1S
(0|110)
(4)S → ε | (0 | 11*0)S
→ ε | 0S | 11*0S
S → 11*0S
→ 1A
A → 1*0S
→ 1A | 0S
S → ε | 0S | 1A
A → 1A | 0S
2. 自动机M=({q0,q1,q2,q3},{0,1},f,q0,{q3})
其中f:
(q0,0)=q1
(q1,0)=q2
(q2,0)=q3
(q0,1)=q0
(q1,1)=q0
(q2,1)=q0
(q3,0)=q3
(q3,1)=q3
画现状态转换矩阵和状态转换图,识别的是什么语言。
3.由正规式R 构造 自动机NFA
(a|b)*abb
(a|b)*(aa|bb)(a|b)*
1(1010*|1(010)*1)*0
