Finite groups with many elements of the same order

Abstract

We study a conjecture by Deaconescu on the solubility of finite groups with claims that if more than half of the elements in a finite group has the same order k, then the group is soluble. We show that the original conjecture fails by presenting some counterexamples. By restricting to a fixed k, the conjecture may or may not hold depending on k. We prove that if k is a power of a prime other than 2 or 3, or if k=2, 3 or 4, then the conjecture holds, while it fails for many other choices of k including all multiples of 2 and 3 which are larger than 5. For k=4 we also find the sharp upper bound of the ratio of elements of order 4 in non-soluble groups. We also prove that for all k>1, it is always possible to find a finite non-soluble group where at least 2/15 of the elements have order k.