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UNIT-1 — Group Theory (UGC NET: Computer Science & Applications)

(Groups • Subgroups • Semigroups • Product & Quotients • Isomorphism • Homomorphism • Automorphism • Rings • Integral Domains • Fields • Applications)

1. SEMIGROUPS

Definition: Semigroup

A semigroup is a set $S$ with a binary operation $*$ such that:

Closure:
For all $a, b \in S$ ,

$a * b \in S .$
Associativity:
For all $a, b, c \in S$ ,

$(a * b) * c = a * (b * c) .$

No requirement of identity or inverse.

Example:

$(N, +)$ is a semigroup.

2. MONOID

Definition: Monoid

A monoid is a semigroup with an identity element $e$ such that:

$e * a = a * e = a \forall a \in S .$

Example:

$(N_{0}, +)$ with identity 0.

3. GROUPS

Definition: Group

A group is a set $G$ with a binary operation $*$ satisfying:

Closure: $a * b \in G$ .
Associativity: $(a * b) * c = a * (b * c)$ .
Identity: There exists $e \in G$ such that $e * a = a * e = a$
Inverse: For each $a \in G$ , there exists $a^{- 1} \in G$ such that

$a * a^{- 1} = a^{- 1} * a = e .$

Definition: Abelian Group

A group is Abelian (or commutative) if:

$a * b = b * a \forall a, b \in G .$

4. SUBGROUPS

Definition: Subgroup

A non-empty subset $H$ of a group $G$ is a subgroup if:

$a, b \in H \Rightarrow a * b^{- 1} \in H$
(one-step subgroup test)

– OR –

Equivalent conditions:

Closed under operation
Closed under inverse
Contains identity

Cyclic Subgroup

Generated by an element $g \in G$ :

$⟨ g ⟩ = {g^{n} : n \in Z} .$

5. PRODUCT OF ALGEBRAIC STRUCTURES

Definition: Direct Product of Groups

For groups $G$ and $H$ ,

$G \times H = {(g, h) : g \in G, h \in H}$

with operation

$(g_{1}, h_{1}) * (g_{2}, h_{2}) = (g_{1} * g_{2}, h_{1} * h_{2}) .$

This forms a group.

6. QUOTIENT GROUPS (FACTOR GROUPS)

Normal Subgroup (Important)

A subgroup $N$ of group $G$ is normal if:

$g N = N g \forall g \in G$

or equivalently

$g n g^{- 1} \in N \forall g \in G, n \in N .$

Definition: Quotient Group

If $N$ is a normal subgroup of $G$ :

$G / N = {g N : g \in G}$

with operation

$(g N) (h N) = (g h) N .$

7. HOMOMORPHISM, ISOMORPHISM, AUTOMORPHISM

Definition: Homomorphism

A function $f : G \to H$ between groups is a homomorphism if:

$f (a * b) = f (a) * f (b) \forall a, b \in G .$

Kernel:

$\ker (f) = {x \in G : f (x) = e_{H}}$

Image:

$Im (f) = {f (x) : x \in G}$

Definition: Isomorphism

A homomorphism that is bijective.
Isomorphic groups have:

same structure
same properties
different elements but identical algebraic behavior

Notation:

$G ≅ H$

Definition: Automorphism

An isomorphism from a group to itself:

$f : G \to G .$

The set of all automorphisms forms a group under composition.

8. RINGS

Definition: Ring

A ring $(R, +, \cdot)$ is a set with two operations satisfying:

Under Addition:

Associative
Commutative
Identity (0)
Inverses exist (each element has an additive inverse)

Under Multiplication:

Associative
Closed

Distributive Laws:

$a (b + c) = a b + a c, (a + b) c = a c + b c .$

Definition: Commutative Ring

If multiplication is commutative:

$a b = b a .$

Definition: Ring with Unity

A ring with multiplicative identity $1$ such that

$1 \cdot a = a \cdot 1 = a .$

9. INTEGRAL DOMAINS

Definition: Integral Domain

A commutative ring with unity and no zero divisors.

Zero divisor definition:

Non-zero $a, b \in R$ such that

$a b = 0.$

Thus, in an integral domain:

$a b = 0 \Rightarrow a = 0 or b = 0.$

Examples:

$Z$
Polynomial rings over fields

10. FIELDS

Definition: Field

A set $F$ with two operations (+,·) such that:

Under addition:

Forms an Abelian group.

Under multiplication:

Non-zero elements $F - {0}$ form an Abelian group.

Distributivity holds.

Examples:

Rational numbers $Q$
Real numbers $R$
Complex numbers $C$
Finite field $G F (p)$ where p is prime

11. APPLICATIONS OF GROUP THEORY (in Computer Science)

✔ Cryptography
– Uses groups, rings, finite fields
– Example: RSA, ECC use modular arithmetic groups

✔ Coding Theory
– Error-correcting codes use group and field structures
– Linear codes over finite fields

✔ Automata Theory
– Symmetry groups help in minimizing finite automata

✔ Graph Theory
– Automorphism groups classify graphs by symmetry

✔ Computer Graphics
– Rotations & transformations form groups

✔ Network Theory
– Cayley graphs build interconnection networks

✔ Algorithms
– Group operations used in hashing, randomization

Tag: Group Theory: Groups

UGC NET Computer Science Unit 1 – Group Theory

Go back to UGC NET COMUPTER SCIENCE

(Groups • Subgroups • Semigroups • Product & Quotients • Isomorphism • Homomorphism • Automorphism • Rings • Integral Domains • Fields • Applications)

1. SEMIGROUPS

Definition: Semigroup

Example:

2. MONOID

Definition: Monoid

Example:

3. GROUPS

Definition: Group

Definition: Abelian Group

4. SUBGROUPS

Definition: Subgroup

Cyclic Subgroup

5. PRODUCT OF ALGEBRAIC STRUCTURES

Definition: Direct Product of Groups

6. QUOTIENT GROUPS (FACTOR GROUPS)

Normal Subgroup (Important)

Definition: Quotient Group

7. HOMOMORPHISM, ISOMORPHISM, AUTOMORPHISM

Definition: Homomorphism

Kernel:

Image:

Definition: Isomorphism

Definition: Automorphism

8. RINGS

Definition: Ring

Under Addition:

Under Multiplication:

Distributive Laws:

Definition: Commutative Ring

Definition: Ring with Unity

9. INTEGRAL DOMAINS

Definition: Integral Domain

Zero divisor definition:

Examples:

10. FIELDS

Definition: Field

Under addition:

Under multiplication:

Distributivity holds.

Examples:

11. APPLICATIONS OF GROUP THEORY (in Computer Science)