← 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 GG is isomorphic to some quotient group of GG.

Technique

Standard proof of First Isomorphism Theorem: kernel is normal; define ϕˉ\bar\phi on cosets; show well-defined, homomorphism, bijective.

Solution

Statement (First Isomorphism Theorem). Let ϕ:GG\phi:G\to G' be a group homomorphism with kernel K=kerϕ={gG:ϕ(g)=eG}K=\ker\phi=\{g\in G:\phi(g)=e_{G'}\}. Then:

  1. KK is a normal subgroup of GG.
  2. G/Kϕ(G)G/K\cong\phi(G) (the image).

So the homomorphic image ϕ(G)\phi(G) is isomorphic to the quotient G/KG/K.

Step 1 — KK is a subgroup

KK is a subgroup ✓.

Step 2 — KK is normal

For any gGg\in G and kKk\in K: ϕ(gkg1)=ϕ(g)ϕ(k)ϕ(g1)=ϕ(g)eϕ(g)1=e\phi(gkg^{-1})=\phi(g)\phi(k)\phi(g^{-1})=\phi(g)\cdot e\cdot\phi(g)^{-1}=e.

So gkg1Kgkg^{-1}\in K. Hence gKg1KgKg^{-1}\subseteq K for all gGg\in GKGK\triangleleft G.

Step 3 — Define isomorphism ϕˉ:G/Kϕ(G)\bar\phi:G/K\to\phi(G)

Define ϕˉ(gK)=ϕ(g)\bar\phi(gK)=\phi(g).

Well-defined. If gK=gKgK=g'K, then g1gKg^{-1}g'\in K, so ϕ(g1g)=e\phi(g^{-1}g')=e, i.e., ϕ(g)1ϕ(g)=e\phi(g)^{-1}\phi(g')=e, i.e., ϕ(g)=ϕ(g)\phi(g)=\phi(g'). So ϕˉ\bar\phi is well-defined.

Homomorphism. ϕˉ(gKgK)=ϕˉ(ggK)=ϕ(gg)=ϕ(g)ϕ(g)=ϕˉ(gK)ϕˉ(gK)\bar\phi(gK\cdot g'K)=\bar\phi(gg'K)=\phi(gg')=\phi(g)\phi(g')=\bar\phi(gK)\bar\phi(g'K).

Surjective. For any yϕ(G)y\in\phi(G), y=ϕ(g)y=\phi(g) for some gGg\in G, so y=ϕˉ(gK)y=\bar\phi(gK).

Injective. If ϕˉ(gK)=eG\bar\phi(gK)=e_{G'}, then ϕ(g)=e\phi(g)=e, so gKg\in K, so gK=KgK=K = identity in G/KG/K. So kerϕˉ={K}\ker\bar\phi=\{K\}, hence ϕˉ\bar\phi is injective.

Step 4 — Conclusion

ϕˉ\bar\phi is a bijective homomorphism, i.e., an isomorphism. Therefore

Answer

  G/Kϕ(G), where K=kerϕ.  \boxed{\;G/K\cong\phi(G),\text{ where }K=\ker\phi.\;}
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