Doubly Sequenceable Groups

Abstract

Given a sequence g: g0,…, gm, in a finite group G with g0=1G, let g: g0,…, gm, be the sequence defined by g0=1G and gi=gi-1-1gi for 1≤ i ≤ m. We say that G is doubly sequenceable if there exists a sequence g in G such that every element of G appears exactly twice in each of g and g. If a group G is abelian, odd, sequenceable, R-sequenceable, or terraceable, then G is doubly sequenceable. In this paper, we show that if N is an odd or sequenceable group and H is an abelian group, then N × H is doubly sequenceable.