A bijection from a finite group to the cyclic group with a divisibility property on the element orders

Mohsen Amiri

A bijection from a finite group to the cyclic group with a divisibility property on the element orders

Abstract

We show that any finite group G there exists a bijction f from G onto Cn such that o(x) divides o(f(x)) for all x∈ G. This confirm Problem 18.1 in [7].

0

Discussion (0)

Sign in to join the discussion.

Loading comments…