Abstract Algebra/Sets and Compositions

A set is a grouping of values, and are generally denoted with upper-case letters. For instance, let's say that A is the set of all first names that start with the letter 'A'. From this definition, we can see that "Andrew" is a member of set A, but "Michael" is not.

Here are some of the common sets:

${\displaystyle \mathbb {N} }$: The Natural Numbers ${\displaystyle \mathbb {Z} }$: The Integers ${\displaystyle \mathbb {Q} }$: The Rational Numbers ${\displaystyle \mathbb {R} }$: The Real Numbers ${\displaystyle \mathbb {C} }$: The Complex Numbers

The Natural Numbers are the set of non-negative and non-zero integers ${\displaystyle \{1,2,3,4,\ldots \}.}$ The Integers are all the natural numbers, their negative counterparts and zero ${\displaystyle \{\ldots ,-2,-1,0,1,2,\ldots \}}$. The Rational numbers are all the numbers that can be formed as a fraction of two integers with a non-zero denominator. The Real numbers include the rational numbers, and also includes all the numbers that cannot be formed as a ratio of two integers. The Complex numbers are all the numbers that involve the imaginary number, i. Notice that C can contain numbers that are imaginary (no real part), real (no imaginary part) and complex (real and imaginary parts).

Frequently, it is required that we define a set by a specific mathematical relationship. For instance, we can say that we want to define the set of all the even integers. Since ${\displaystyle \mathbb {Z} }$ is the set notation for integers, we can say:

${\displaystyle \{x\in \mathbb {Z} :x{\mbox{ mod }}2=0\}}$

In English, this statement says "All x in set ${\displaystyle \mathbb {Z} }$ such that x modulo 2 equals zero". Or, if we are not familiar with the modulo operation, it is perfectly acceptable to use plain English when defining our set:

${\displaystyle \{x\in \mathbb {Z} :x{\mbox{ is even}}\}}$

The colon (:) here is read as "such that". This notation will come up a lot in the rest of this book, so it is important for the reader to familiarize themselves with this.

${\displaystyle a\in A}$ denotes that ${\displaystyle a}$ is an element of A.

A subset S of a set A is a set such that ${\displaystyle s\in S\to s\in A}$. This is denoted as ${\displaystyle S\subset A}$.

The intersection of two sets A and B is the set ${\displaystyle A\cap B=\{s:s\in A\land s\in B\}}$.

The union of two sets A and B is the set ${\displaystyle A\cup B=\{s:s\in A\lor s\in B\}}$.

If ${\displaystyle S\subset A}$, the set ${\displaystyle A-S=\{s:s\in A\land s\notin S\}}$.

A cartesian product between two sets shows the domains of two or more variables. For instance, if we have the variables x and y, and the sets A and B, we can use the cartesian product to show the domains of x and y in terms of A and B:

${\displaystyle A\times B=\{(x,y):x\in A,y\in B\}}$

Compositions are operations on a set that act on numbers of the set, and return a value that is in that same set, that is if ${\displaystyle A}$ is a set, a composition is a function ${\displaystyle *:A\times A\to A}$

For instance, addition between two integers produces an integer result. Therefore addition is a composition in the integers. Whereas division of integers is an example of an operation that is not a composition, since ${\displaystyle 1/2}$ is not an integer.

If we have a set ${\displaystyle A}$, we say that a composition acts on ${\displaystyle A\times A}$ and produces a result in ${\displaystyle A}$. This is also known as closure.

A composition Δ is said to be associative if:

${\displaystyle (A\Delta B)\Delta C=A\Delta (B\Delta C)}$

For instance, the addition operation is an associative operation over the integers, Z:

${\displaystyle (1+2)+3=6=1+(2+3)}$

Notice however, that subtraction is not associative:

${\displaystyle (1-2)-3=-4,\qquad 1-(2-3)=2}$

A composition Δ is said to be commutative if:

${\displaystyle A\Delta B=B\Delta A}$

For instance, multiplication is commutative because:

${\displaystyle 2\times 3=6=3\times 2}$

Notice that division is not commutative:

${\displaystyle 2\div 3={\frac {2}{3}},\qquad 3\div 2={\frac {3}{2}}}$

A Neutral Element (or Identity) is an item in E such that a composition in E ${\displaystyle \times }$ E into E returns the other operand. For instance, say that we have a composition Δ, a neutral element ${\displaystyle e\in E}$, and a non-neutral element ${\displaystyle x\in E}$. If Δ is commutative, we have the following relation:

${\displaystyle e\Delta x=x\Delta e=x}$

For instance, in addition, the neutral element is 0, because 1 + 0 = 1. Also notice that in multiplication, 1 is the neutral element, because 1 × 2 = 2.

Each composition may have only one neutral element, if it has any at all. To prove this fact, let's assume a composition Δ with two neutral elements, e and f:

${\displaystyle e\Delta f=e}$

${\displaystyle f\Delta e=f}$

But since e and f are commutative under Δ by definition, we know that e = f.

Ordered pairs are artificial constructions where we set two values into a specific order. More formally, we can define an ordered pair as the set
${\displaystyle (a,b)=\{\{a\},\{a,b\}\}}$

Let's say that we have two ordered pairs, A and B, comprised of values ${\displaystyle a_{1},a_{2},b_{1}}$ and ${\displaystyle b_{2}}$ respectively:

${\displaystyle A=(a_{1},a_{2})}$

${\displaystyle B=(b_{1},b_{2})}$

We can see that ${\displaystyle A=B}$ if and only if

${\displaystyle a_{1}=b_{1}{\mbox{ and }}a_{2}=b_{2}}$

A function is essentially a mapping that connects two values, x and y. We use the following notation to show that our function f is a relationship between x and y:

${\displaystyle (x,y)\in f}$

Notice that x and y form an ordered pair: If we reverse the order of x and y, the relationship will be different (or non-existent). We say that the set of possible values for x is the domain, D, of the function, and the set of possible y values is the Range, R.

In other words, using some of the terms we have discussed already, we say that our function f maps from "D × R into R".

If f is a function in D × R, to R, then f⁻¹ is the inverse of f if it is in R × D to D, and the following relationship holds:

${\displaystyle (x,y)\in f,\qquad (y,x)\in f^{-1}}$

• Of the four arithmetic operations, addition, subtraction, multiplication, and division, which are associative? commutative?
• Using the definition of the ordered pair as a model, give a formal definition for an ordered n-tuple: ${\displaystyle (a_{1},a_{2},\ldots a_{n})}$