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We have stated that on of the main objectives of group theory is to write down a complete list of non-isomorphic groups. At first, such a task appears hopeless. For, as we have seen, groups pop up in some very unexpected places and, therefore, if we set out to compile a list of all non-isomorphic groups, we would hardly begin to know where to look. The following theorem of Cayley solves this dilemma.

Theorem 1: Every group is isomorphic to a subgroup of a permutation group

Proof: Let G be a group, g Cayley’s theorem | Algebra - Mathematics G. define

Cayley’s theorem | Algebra - Mathematics

If Pg(x) = Pg(y), then xg-1 = yg-1, so that x = y. Therefore, Pg is an injection. If y Cayley’s theorem | Algebra - Mathematics G, then Pg(yg) = yg · g-1 = y. Therefore, Pg is a surjection. Thus, since Pg is a bijection, Pg is a permutation of the elements of the set G, and Pg ∈ SG. Let us consider the mapping

G → SG

defined by

g Cayley’s theorem | Algebra - Mathematics Pg                           (1)

Since Pgg' = x(gg')-1 = PgPg'(x), the mapping (1) is a homomorphism. But P = 1SG if and only if x · g = x for all x Cayley’s theorem | Algebra - Mathematics G, which occurs if and only if g = 1G. Therefore, the kernel of the homomorphism (1) is 1G, and therefore the mapping (1) is an injection. Thus we have shown that G is isomorphic to a subgroup of SG.

What Cayley's theorem tells us is that permutation groups and their subgroups are all the groups that can exist. Unfortunately, the problem of classifying the subgroups of a permutation group is extremely complicated, even in the case of a finite permutation group. Therefore, Cayley's theorem does not allow us to easily identify a complete list of groups.

The above argument actually proves somewhat more than claimed. For if G is finite, having order n, then G is isomorphic to a subgroup of SG. Therefore we have

Corollary 2: If G has finite order n, then G is isomorphic to a subgroup of Sn.   

The document Cayley’s theorem | Algebra - Mathematics is a part of the Mathematics Course Algebra.
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FAQs on Cayley’s theorem - Algebra - Mathematics

1. What is Cayley's theorem in mathematics?
Ans. Cayley's theorem, also known as Cayley's representation theorem, states that every group can be represented as a group of permutations. In other words, every abstract group can be realized as a group of transformations on a set.
2. How does Cayley's theorem relate to the study of groups?
Ans. Cayley's theorem is significant in the study of groups as it provides a way to understand abstract groups by representing them as groups of permutations. This allows researchers to apply techniques and concepts from the theory of permutations to gain insights into the properties and structures of abstract groups.
3. Can you provide an example of how Cayley's theorem works?
Ans. Sure! Let's consider the group of integers modulo 4 under addition. Cayley's theorem states that this group can be represented as a group of permutations. In this case, the four permutations would be the identity permutation, the permutation that shifts all elements one position to the right, the permutation that shifts all elements two positions to the right, and the permutation that shifts all elements three positions to the right.
4. What are the implications of Cayley's theorem for studying abstract groups?
Ans. Cayley's theorem allows researchers to study abstract groups through the lens of permutation groups. By doing so, they can leverage existing knowledge and techniques from permutation theory to gain a deeper understanding of the properties and structures of abstract groups. This connection between abstract groups and permutation groups has opened up new avenues for research and has proven to be a powerful tool in group theory.
5. Are there any limitations to Cayley's theorem?
Ans. While Cayley's theorem is a fundamental result in group theory, it does have some limitations. One limitation is that the representation of a group as a group of permutations does not always provide an intuitive understanding of the group's structure. Additionally, Cayley's theorem does not guarantee a unique representation of a group as a group of permutations, as multiple permutation representations may exist for a given abstract group. Nonetheless, despite these limitations, Cayley's theorem remains a crucial tool in the study of groups.
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