← 2022 Paper 2
UPSC 2022 Maths Optional Paper 2 Q2b — Step-by-Step Solution
15 marks · Section A
Isomorphism theorems (First, Second, Third) · Algebra · asked 2× in 13 yrs · Read the full method →
Question
Prove that every homomorphic image of a group G is isomorphic to some quotient group of G.
Technique
Standard proof of First Isomorphism Theorem: kernel is normal; define ϕˉ on cosets; show well-defined, homomorphism, bijective.
Solution
Statement (First Isomorphism Theorem). Let ϕ:G→G′ be a group homomorphism with kernel K=kerϕ={g∈G:ϕ(g)=eG′}. Then:
- K is a normal subgroup of G.
- G/K≅ϕ(G) (the image).
So the homomorphic image ϕ(G) is isomorphic to the quotient G/K.
Step 1 — K is a subgroup
- e∈K since ϕ(e)=eG′.
- If a,b∈K: ϕ(ab)=ϕ(a)ϕ(b)=e⋅e=e, so ab∈K.
- If a∈K: ϕ(a−1)=ϕ(a)−1=e−1=e, so a−1∈K.
K is a subgroup ✓.
Step 2 — K is normal
For any g∈G and k∈K: ϕ(gkg−1)=ϕ(g)ϕ(k)ϕ(g−1)=ϕ(g)⋅e⋅ϕ(g)−1=e.
So gkg−1∈K. Hence gKg−1⊆K for all g∈G ⇒ K◃G.
Step 3 — Define isomorphism ϕˉ:G/K→ϕ(G)
Define ϕˉ(gK)=ϕ(g).
Well-defined. If gK=g′K, then g−1g′∈K, so ϕ(g−1g′)=e, i.e., ϕ(g)−1ϕ(g′)=e, i.e., ϕ(g)=ϕ(g′). So ϕˉ is well-defined.
Homomorphism. ϕˉ(gK⋅g′K)=ϕˉ(gg′K)=ϕ(gg′)=ϕ(g)ϕ(g′)=ϕˉ(gK)ϕˉ(g′K).
Surjective. For any y∈ϕ(G), y=ϕ(g) for some g∈G, so y=ϕˉ(gK).
Injective. If ϕˉ(gK)=eG′, then ϕ(g)=e, so g∈K, so gK=K = identity in G/K. So kerϕˉ={K}, hence ϕˉ is injective.
Step 4 — Conclusion
ϕˉ is a bijective homomorphism, i.e., an isomorphism. Therefore
Answer
G/K≅ϕ(G), where K=kerϕ.