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Normal Subgroups,Quotient Groups and Homomorphisms - Group Theory, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET PDF Download
A normal subgroup is a subgroup that is invariant under conjugation by any element of the original group: H is normal if and only if gHg-1 = H for any g ∈ G. Equivalently, a subgroup H of G is normal if and only if gH = Hg for any g ∈ G.
Normal subgroups are useful in constructing quotient groups, and in analyzing homomorphisms.
Quotient Groups
A quotient group is defined as G/N for some normal subgroup N of G, which is the set of cosets of N w.r.t. G, equipped with the operation º satisfying for all g, h ∈ G.
This definition is the reason that N must be normal to define a quotient group; it holds because the chain of equalities
holds, where 
utilizes the fact that Nh = hN for any h (true iff N is normal, by definition).
For example, consider the subgroup 
(which is an additive group). The left cosets are
so 
This can be more cleanly written as
which is isomorphic to {0,1} or the cyclic group C2. Additional examples:
- The quotient group Z/2Z, where 2Z--t the group of even integers--is a normal subgroup of , is isomorphic to as well.
- The quotient group R/Z, where Z--the group of integers--is a normal subgroup of the reals , is isomorphic to the circle group defined by the complex numbers with magnitude 1.
Homomorphisms and Normal Subgroups
Recall that a homomorphism from G to H is a function φ such that
for all g1, g2 ∈ G.
The kernel of a homomorphism is the set of elements of G that are sent to the identity in H, and the kernel of any homomorphism is necessarily a normal subgroup of G.
In fact, more is true: the image of G under this homomorphism (the set of elements G is sent to under φ) is isomorphic to the quotient group G/ker(φ), by the first isomorphism theorem. This provides a bijection between normal subgroups of G and the set of images of G under homomorphisms.
Thus normal subgroups can be classified in another manner:
| A subgroup N of G is normal if and only if there exists a homomorphism on G whose kernel is N. |
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FAQs on Normal Subgroups,Quotient Groups and Homomorphisms - Group Theory, CSIR-NET Mathematical Sciences - Mathematics for IIT JAM, GATE, CSIR NET, UGC NET
| 1. What is a normal subgroup? |  |
Ans. A normal subgroup of a group is a subgroup that is invariant under conjugation by any element of the group. In other words, for any element in the normal subgroup, if we conjugate it by any element of the group, the result will still be an element of the normal subgroup.
| 2. What is a quotient group? | |
Ans. A quotient group, also known as a factor group, is a group formed by dividing a given group by one of its normal subgroups. The elements of the quotient group are the cosets of the normal subgroup, and the group operation is defined by the coset multiplication.
| 3. What is the significance of normal subgroups and quotient groups? | |
Ans. Normal subgroups and quotient groups play a crucial role in group theory. They help us understand the structure and properties of groups by studying their subgroups and the relationships between them. Normal subgroups allow us to define quotient groups, which capture essential information about the original group while simplifying its structure.
| 4. What is a homomorphism in group theory? | |
Ans. A homomorphism is a map between two groups that preserves the group operation. In other words, if we have two groups G and H, a homomorphism from G to H is a function f: G -> H such that for any elements a and b in G, f(a * b) = f(a) * f(b), where * denotes the group operation in both G and H.
| 5. How are homomorphisms related to normal subgroups and quotient groups? | |
Ans. Homomorphisms are closely related to normal subgroups and quotient groups. Specifically, if we have a homomorphism f: G -> H, the kernel of f, denoted by Ker(f), is a normal subgroup of G. The kernel is the set of elements in G that map to the identity element in H. Moreover, the image of f, denoted by Im(f), is a subgroup of H, and the quotient group G/Ker(f) is isomorphic to Im(f), where Ker(f) is the kernel of f.
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