Wk1 Notes PDF Lecture Notes

Summary

These lecture notes cover fundamental concepts in abstract algebra, including set theory, operations, and definitions. Examples and proofs are included within the notes. This is a good starting point for those new to abstract algebra.

Full Transcript

Wittis artifact
algebra study of structures the exploration ofimaginativelogic

groups operationsstructuresringssets

useful forcryptography
iii
Set Asethas elements sometimes land members ix e s is in a setlands is anelementof s

keyfact Anelement iseitherin s ornotin s butnotboth aLawofnoncontradiction excludedminus

Example
pe IN p is prime p inthe naturalnumbers such that p isprime this is a set

Example R theset allsetsthat donot contain themselves
of
S I S s isthisaset No sentreferential behaviorlike
this Russel'sparadox

Somecommonsets

1IN natural numbers 0,11213

Eight sina.am

3 rationalnumbers I a be bto
ration
4 IR
realtumier
in
comfreisintert
atbi I a.be R

Definition 1 if A B aresets then Ais a subset
of itandonly if every element
of A is in B
Definition 2 If Aand Baresets Ais equalto B oftheelementsof AandB are equal

e'quit
Lemma1 Let Aand B be sets A is is itandonlyif A is a subsetg B A B and B is a subset
of A cB a

have toprove it bothways citandonlyit

Lemma2 Leta Bic besets If A B and B c then a c

Proof Let a A Because a B weknow a B sinceBecforallbeB wehave bec

since a c B a e e andby desinition A c

Definition
3 let Aand B besets intheunionof aandB isthethings ineither A or B Aub x xc a or e B
 a the intersection of aandB isthesetofthings in aandB ans I aBy 0i
Definition 4 It a Baresetsthenthecomplement of a B is theset ofelements in notin a Ac A BIA be B b A

1B
5 Let Aand B beset TheCartesian productof Aand B isthesetof tuples can a ca.be B axB
I can s
Definition where

operations

ecture 2 911g

Definitionof operations Let A be aset A binaryoperationon a is a race
forassigning toeachelementexineaxa exacting aelement yea

example I y x xyty binaryoperation

IR og incx.gs
netbinaryoperation oc.si incon

iru a any mincx.gs binaryoperation isbiggest

abiciaer
5 ait binaryoperation

Given a binaryoperationwecanmakeanoperationtable

on o i

o o o
com cos
i o 1

Importantdefinitions regarding operations

set A bea settogetherwitha binaryoperation

is commutativemeans
an baa for anic e a

is associativemean cab c a co c for anic e a

has an identitymean there exists ee a suchthat a e a and e a a a ca
Definition It 1A is a set with binary operation and identity ee A then A has inverses it for all a bicea

same ii iii Iii c a Donna

Example

List Binary Op Commutative Associative Identity

1 R.rs
IL
2 Peopueheight shortest

3 I o

4 I 2 313 2 doesn't worksince 01 1 i

s 0,13

I I xtxyty 2 0 0 2

7 Ro ofmining a

a 2 2matrices