Classifying Groups of Certain Orders
Abstract
We will first discuss the question of which integers n have exactly one group of order n, namely the cyclic group Z/nZ. We will see that these are the integers that are relatively prime to the Euler totient function ϕ(n). Then we discuss how many groups there are of order p3 for each prime p. We end with a couple of interesting results and conjectures pertaining to groups of squarefree order.
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