DHARMALGEBRAIC STRUCTURES 79For example, the additive inverse define the subtraction i.e., x + (– x) = ê. Similarly,
the multiplication inverse defines division i.e., x H (1/x) = ê.
Assume an algebraic system consists of two operators (X, , ), then
VI. Distributive Property. Since and are two binary operations on set X, and if
x, y and z ∈ X then operator is said to be distributive over whenever,
x (y z) = (x y) (x z)
and also operator is distributive over whenever,
x (y z) = (x y) (x z)
For example field is an algebraic system. A field is defined by a set of elements, binary
operations + and H, a set of properties 1 to 5, and combination of both operations fulfilling
property 6. A field of real numbers is a common example consists of set of real numbers (R),
with binary operations + and H denoted by (R, +, H). It is the basis for ordinary algebra.
Example 4.1. Let X = {1, 2, 3, 4} and (X, X, f) is a morphism, where function f is represented
by the expression,
f =
1234
2341F
HI
K
Prove that (F, ◊) is an algebraic system, where F is the set of unique composite functions
of f.
Sol. From the composite functions,
f ◊ f = f^2 ; f^2 ◊ f = f^3 ; f^3 ◊ f = f^4 ; and so on.
Determine f^2 , f^3 , f^4 ,.... so we obtainf ◊ f = f^2 =
123
341F
HI
K , f(^2) ◊ f = f (^3) =^123
412
F
H
I
K, f
(^3) ◊ f = f (^4) = 12 3
12 3
F
H
I
K
Since, f^4 is an identity function or mapping, i.e, f^4 = {(x, x)/x ∈ X) = f^0 (assume) and all
others composite of functions are repeated in the set F = {f, f^2 , f^3 , f^0 } or {f^0 , f^1 , f^2 , f^3 }. Since
operation ◊ is closed, commutative and associative together with the existence of an identity
functions, which results (F, ◊) is an algebraic system.
4.2 Groups
Let X be an nonempty set and be an binary operation on X, then algebraic system (X, ) is
called a group, if operation satisfies the following postulates,- is closed,
- is associative,
3.Existence of an identity element, and
4.Existence of the unique inverse.
(Postulates 1 – 4 are called group axioms)
For example, algebraic system (X, ), where X = {+, –} and binary operation is
defined in the table show in Fig. 4.1.
+–
++ –
–– +
Fig. 4.1 Operation table