When and how is a group of order n isomorphic to a regular subgroup of equal order?

Question

In "Group Theory and Its Application to Physical Problems" by Morton Hamermesh, Morton states Cayley's theorem: Every group G of order n is isomorphic with a subgroup of the symmetric group S_n, which makes sense to me.

Later the book discusses regular permutations and regular subgroups, and makes this statement: "...suppose that n is a prime number. Then the group of order n is isomorphic to a regular subgroup of S_n." (page 19 in the Dover edition)

Why is the last sentence true? Is every group of any order n isomorphic to a regular subgroup of S_n?

Answer 1

A permutation group is called regular if it is transitive and all stabilizers are trivial. Left multiplication yields a regular embedding of any group into its group of permutations (so the answer to your second question is "Yes").

Answer 2

To the OP: I think some of us were confused because "regular subgroup" is not a common thing to say if you're not a permutation group theorist.

As Scott points out, any abstract group can be thought of as acting regularly and transitively on some set (e.g. the set of group elements, by translation); so the question "is H a regular subgroup of G?" is only nontrivial if you've first specified a way in which G acts on some other set X -- i.e. if G is given to you as a permutation group, not an abstract group.

(And yes, permutation group theorists appear to have many papers on "regular normal subgroups...")

Answer 3

As far as I can tell, "regular subgroup" means "transitive subgroup of order n of S_n," so I'm a bit confused by your question. Are you confused about why it's transitive? If that's the case, you need to read the proof of Cayley's theorem more carefully.