Symmetric harmoniousness of odd-order groups
Abstract
We prove that every odd-order group is symmetric harmonious: there exists a permutation g0,g1,…, g-1 of elements of G such that the consecutive products g0g1,g1g2,…, g-1g0 also form a permutation of elements of G and g-i=gi-1 for all 1≤ i ≤ -1. We apply this result to obtain new examples of R*-sequenceable groups.
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