XZ 23

SIXTH SEMESTER – APRIL 2008

MT 6601 – APPLIED ALGEBRA

Date : 21/04/2008 Dept. No. Max. : 100 Marks

Time : 9:00 – 12:00

PART – A

Answer ALL questions: (10 x 2 = 20)

PART – B

Answer any FIVE questions. (5 x 8 = 40)

(ii) ( ù PÙ (ù QÙ R) Ú(QÙR) Ú(PÙR) ÛR

((PÚQ) Ùù ( ù PÙ(ùQÚùR)) Ú( ùPÙùR) is a tautology.

(i) (PÙ(P ®Q) (ii) ù (PÚQ) D (PÙQ)

(i) (PÙQ) Ú ( ù PÚQ) Ú(PÙù Q)

(ii) (PÙQ) Ú ( ù PÙ QÙR)

Let be a lattice ordered set. If Π; show that (L,Π, ) is an algebraic lattice.
State and prove Representation theorem for Boolean Algebra.
For any semigroup (S,o), Show that there exists a set N such that (S,o) is embeddable in (N^N, o).
Show that for any monoid (S,o) there exists a semi automation whose monoid is isomorphic to (S,o).

PART – C

Answer any TWO questions. (2 x 20 = 40)

(i) ù (PÙQ) ® ( ù PÚ( ù PÚQ) Û (ù PÚQ)

(ii) (PÙQ) Ù ( ù PÙ ( ù PÙQ) Û (ù PÙQ)

b) Show that the truth values of the following formulas are independent of their

components.

(i) (PÙ ( P® Q) ® Q

(ii) (P® Q) D( ù PÚQ)

(i) ( ù PÚQ)

(ii) (PÙQ) Ú( ù PÙR) Ú( QÙR)

b) Show that a modular lattice is distributive if and only if none of its sub lattices is isomorphic to the diamond lattice .

b) Let ~₁ and ~₂ be two congruence relations on (S,o). Show that ~₁, C ~₂ if and only if is an epimorphism of (S/~_1,o) onto (S/~₂, o).
c) For any f show that there exists a semi group F which is free on B.
a) For two automation if show that is a homomorphic image of .
b) If the automation is a homomorphic image of , show that is a homomorphic image of .
c) Explain parallel composition and series composition of two automata and .