Permutations with a distinct divisor property
Abstract
A finite group of order n is said to have the distinct divisor property (DDP) if there exists a permutation g1,…, gn of its elements such that gi-1gi+1 ≠ gj-1gj+1 for all 1≤ i<j<n. We show that an abelian group is DDP if and only if it has a unique element of order 2. We also describe a construction of DDP groups via group extensions by abelian groups and show that there exist infinitely many non abelian DDP groups.
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