Solution of Exam #1
-transition (e.g., from state 2 to 3)
#2 (4 points) Convert the NFA to a DFA.
a b
{1, 3} {1, 3} {2}
{2} {2, 3} {3}
{2, 3} {1, 2, 3} {3}
{3} {1, 3} {0}
{1, 2, 3} {1, 2, 3} {2, 3}
#3 (4 points) Using the algorithm to eliminate states, eliminate all but the initial & final states.
Using original:
#4 (3 points) Give the regular expression from #3.
((lambda U ba*(aUb))a)*
E->E+T|T
#5 (3 points) Specify V,
None
If L(G) were regular, then there is a DFA with k states that accepts it
#11 (5 points) Show by induction that the length of a derivation in a Chomsky Normal Form Grammar for a string of lenght n is 2n-1 for n> = 1.
#5 - #10 Consider the following grammar, G
T->T*F|F
F->(E)|x
, P, and S in G = (V, , P, S)
V = {E, T, F}
= {+, *, (, ), x}
P = above
S = E
#6 (3 points) Eliminate any chain rules in G
E->E+T|T*F|(E)|x
T->T*F|(E)|x
F->(E)|x
#7 (3 points) Eliminate any useless symbols in G
#8 (3 points) Convert G to Chomsky Normal Form
(CNF has non-recursive start symbol)
E'->E+T|T*F|(E)x
E->E+T|T*F|(E)|x
T->T*F|(E)|x
F->(E)|x
E'->E, T1|TT2|T3T4|x
T1->T5T
T5->+
T2->T6F
T6>->*
T3->(
T4->ET7
T7->)
etc.
#9 (3 points) Eliminate any direct left recursion in G
E->TE'|T
E'->+TE'|
T->FT'|F
T'->*FT'|
F->(E)|x
#10 (5 points) Use the pumping lemma to show L(G) is not regular
Pick Z = (kx)k. Then, by the PL, Z = uvw with L(uv)< = k. So uv is all "(".
Also, uvvw must be in L. But this means uvvw has more "(" than ")". Contradiction.
Proof by induction on n.
Basis
n = 1 so w =
or w = a .
So, derivation is S-> or S->a which has length 1 = 2*1-1
I.H:
Assume For a string of length k, L(deriv.) = 2k-1, 1<= k<= n
F.S: To show when L(w) = n+1, L(deriv.) = 2(n+1)-1. Since
n >= 1, n+1 >= 2, so derivation must start with S = >AB.
Then, L(deriv. w) = L(deriv. u)+L(deriv. v) + 1
= 2(L(u)-1) + 2(L(v)-1) + 1 (by IH)
= 2(L(u)+L(v)) -1
= 2L(w)-1
= 2(n+1)-1