Abstract Algebra (Math 113) - Revision Sheet

1. 📌 Essentials

Algebraic structures: sets with operations satisfying specific axioms (groups, rings, fields).
Prime number: only divisible by 1 and itself.
Group: set with an associative binary operation, identity, and inverses.
Ring: set with addition and multiplication, distributive, with identity.
Field: commutative ring with multiplicative invers for non-zero elements.
Congruence mod m: a ≡ b mod m m | (a−b); forms residue classes.
Cayley's theorem: any group G embeds into a symmetric group Σ(G).
Normal subgroup: invariant under conjugation; allows quotient groups.
Simple group: no non-trivial normal subgroups; building block of finite groups.
Galois extension: normal + separable; automorphisms fixing base field.

2. 🧩 Key Structures & Components

Set — collection of objects.
Function — rule from set S to T, with properties: injective, surjective, bijective.
Equivalence relation — partitions set into classes; reflexive, symmetric, transitive.
Integers (Z) — prime factorization, gcd, divisibility.
Residue class — elements of Z/mZ; field iff m prime.
*Group (G, ) — closure, associativity, identity, inverses.
Cyclic group — generated by one element; isomorphic to Z or Z/mZ.
Permutation group Σ(S) — all bijections S→S.
Normal subgroup (H ◁ G) — stable under conjugation.
Quotient group G/H — group formed when H normal.
Ring — set with addition and multiplication, distributive.
Field — commutative ring with inverses, algebraically closed (C).
Polynomial ring F[X] — polynomials over field F.
Galois group — automorphisms fixing base field.

3. 🔬 Functions, Mechanisms & Relationships

Set functions: compose (f ◦ g), identity Id.
Equivalence classes: define partitions; relate to quotient sets.
Prime factorization: unique in Z; fundamental for divisibility.
Congruences: partition Z into residue classes; structure depends on primality.
Groups: hierarchy: cyclic ⊆ abelian ⊆ general groups.
Permutation actions: orbits and stabilizers linked via Orbit-Stabilizer.
Normal subgroups: allow well-defined quotient groups.
Isomorphism theorems: relate subgroups, quotients, and automorphisms.
Galois theory: automorphisms correspond to field extensions; group structure determines solvability.

4. Classification & Summary Table

Item	Key Features	Notes
Set & Function	Sets: collections; functions: rules; composition	Basic language of algebra
Equivalence Relation	Reflexive, symmetric, transitive; partitions	Equivalence classes form partitions
Integers (Z)	Prime, gcd, divisibility, Euclid’s algorithm	Unique prime factorization
Congruence mod m	a ≡ b mod m iff m	(a−b); residue classes Z/mZ
Group (G, *)	Closure, associativity, identity, inverses	Cyclic, abelian, subgroups, cosets
Cyclic Group	Generated by one element; isomorphic to Z or Z/mZ	Fundamental building block
Permutation Group Σ(S)	All bijections; acts on S	Cayley’s theorem: G embeds into Σ(G)
Normal Subgroup	gHg⁻¹ = H; quotient G/H well-defined	Key for constructing quotient groups
Simple Group	No non-trivial normal subgroups	Cyclic prime order, alternating, Lie, sporadic
Ring	Set with +, ×; distributive, identity	Commutative rings, ideals
Field	Commutative ring with inverses; algebraically closed (C)	Basic algebraic structure
Polynomial Ring	Over field F; degree, irreducibility, roots	Factorization, minimal polynomial
Galois Group	Automorphisms fixing base field; order = [E:F]	Determines solvability of polynomials

5. 🗂️ Hierarchical Diagram (ASCII)

Algebraic Structures
 ├─ Sets & Functions
 │    ├─ Equivalence Relations
 │    │    └─ Partitions
 │    └─ Functions (composition, identity)
 ├─ Number Systems
 │    ├─ Integers (Z)
 │    │    ├─ Prime factorization
 │    │    └─ GCD, divisibility
 │    └─ Congruences (mod m)
 │         └─ Residue classes Z/mZ
 ├─ Groups
 │    ├─ Cyclic, abelian, subgroups
 │    ├─ Permutation groups Σ(S)
 │    │    └─ Cayley’s theorem
 │    └─ Normal subgroups & quotient groups
 └─ Rings & Fields
      ├─ Rings: +, ×, ideals
      ├─ Fields: inverses, algebraically closed (C)
      └─ Polynomial rings over F

6. ⚠️ High-Yield Pitfalls & Confusions

Confusing cyclic with abelian groups.
Mistaking normal subgroup for any subgroup.
Assuming all quotient groups are automatically groups (must be normal).
Believing Z/mZ is always a field (only if m prime).
Overlooking that automorphisms in Galois groups fix the base field.
Confusing irreducibility with reducibility over different fields.
Assuming all polynomials split over any extension (only algebraically closed fields).
Misunderstanding the difference between separable and normal extensions.

7. ✅ Final Exam Checklist

Define and identify groups, rings, fields.
Understand subgroups, normal subgroups, quotients.
Know Cayley's theorem and its implications.
Explain congruence mod m and residue class structure.
State the Fundamental Theorem of Arithmetic.
Describe cyclic groups and their properties.
Recognize permutation groups and group actions.
Understand Galois extensions and Galois groups.
Apply isomorphism theorems to relate structures.
Identify simple groups and their classification.
Use Eisenstein’s Criterion for irreducibility.
Know the properties of algebraically closed fields.
Connect Galois groups with solvability of polynomials.
Understand field extensions: degree, automorphisms, fixed fields.
Recognize the importance of normality and separability.
Be familiar with polynomial roots and their bounds.

Strictly high-yield, exam-focused, structured for rapid review and mastery.

Hoja de repaso: Abstract Algebra Essentials

Abstract Algebra (Math 113) - Revision Sheet

1. 📌 Essentials

2. 🧩 Key Structures & Components

3. 🔬 Functions, Mechanisms & Relationships

4. Classification & Summary Table

5. 🗂️ Hierarchical Diagram (ASCII)

6. ⚠️ High-Yield Pitfalls & Confusions

7. ✅ Final Exam Checklist

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