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Math4302 Modern Algebra (Lecture 1)
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Group and subgroups
Group
Definition of binary operations
A binary operation (usually denoted by *) on a set X is a function from X\times X to X.
Example of binary relations
+ is a binary operation on \mathbb{Z} or \mathbb{R}.
\cdot is a binary operation on \mathbb{Z} or \mathbb{R}.
division is not a binary operation on \mathbb{Z} or \mathbb{R}. (Consider 0)
Generally, we can define a binary operation over sets whatever we want.
Let X=\{a,b,c\} and we can define the table for binary operation as follows:
| * | a | b | c |
|---|---|---|---|
| a | a | b | b |
| b | b | c | c |
| c | a | b | c |
If we let X be the set of all functions from \mathbb{R} to \mathbb{R}.
then (f+g)(x)=f(x)+g(x),
(f g)(x)=f(x)\circ g(x),
(f\circ g)(x)=f(g(x)), are also binary operations.
Definition of Commutative binary operations
A binary operation * in a set X is commutative if a*b=b*a for all a,b\in X.
Tip
Commutative basically means the table is symmetric on diagonal.
Example of non-commutative binary operations
(f\circ g)(x)=f(g(x)), is not generally commutative, consider constant functions f(x)=1 and g(x)=0.
Definition of Associative binary operations
A binary operation * in a set X is associative if (a*b)*c=a*(b*c) for all a,b,c\in X.
\begin{aligned}
a*((b*c)*d)&=a*(b*(c*d))\quad\text{apply the definition to b,c,d}\\
&=a*(b*(c*d))\quad \text{apply the definition to a,b, (c*d)}\\
&=(a*b)*(c*d)
\end{aligned}
Example of non-associative binary operations
Suppose X=\{a,b,c\}
| * | a | b | c |
|---|---|---|---|
| a | a | b | b |
| b | b | c | c |
| c | a | b | c |
is not associative, take a,b,c as examples.
a*(b*c)=a*c=b\neq (a*b)*c=b*c=c
Theorem for Associativity of Composition
(Associativity of Composition) Let S be a set and let f,g and h be functions from S to S. Then (f\circ g)\circ h=f\circ(g\circ h).
Note
There exists binary operation that is associative but not commutative.
Consider
(f\circ g)wheref,gare functions over some setX.
(f\circ g)(x)=f(g(x))is generally not commutative but always associative.There exists binary operation that is commutative but not associative.
Consider operation defined belows:
S=\{a,b,c\}
* a b c a a b b b b b c c b c c Note that this operation is commutative since the table is symmetric on diagonal.
This operation is not associative, take
a,b,cas examples.
a*(b*c)=a*c=b\neq (a*b)*c=b*c=c
Definition of Identity element
An element e\in X is called identity element if a*e=e*a=a for all a\in X.
Uniqueness of identity element
If X has an identity element, then it is unique.
Proof
Suppose e_1 and e_2 are identity elements of X. Then e_1*e_2=e_2*e_1=e_1=e_2.
Example of identity element
0 is the identity element of + on \mathbb{Z} or \mathbb{R}.
1 is the identity element of \cdot on \mathbb{Z} or \mathbb{R}.
identity zero f(x)=0 is the identity element of (f+g)(x)=f(x)+g(x).
identity one f(x)=1 is the identity element of (f\circ g)(x)=f(g(x)).
identity function f(x)=x is the identity element of (f\circ g)(x)=f(g(x)).
Warning
Not all binary operations have identity elements.
Consider
Suppose
X=\{a,b,c\}
* a b c a a b b b b c c c a b c No identity element exists for this binary operation.