Groups whose elements are not conjugate to their powers
arXiv:1801.05975 · doi:10.1007/s00013-018-1155-3
Abstract
We call a finite group irrational if none of its elements is conjugate to a distinct power of itself. We prove that those groups are solvable and describe certain classes of these groups, where the above property is only required for $p$-elements, for $p$ from a prescribed set of primes.
6 pages