Weak Sequenceability in Cyclic Groups

Abstract

A subset A of an abelian group G is sequenceable if there is an ordering (a1, …, ak) of its elements such that the partial sums (s0, s1, …, sk), given by s0 = 0 and si = Σj=1i ai for 1 ≤ i ≤ k, are distinct, with the possible exception that we may have sk = s0 = 0. In the literature there are several conjectures and questions concerning the sequenceability of subsets of abelian groups, which have been combined and summarized in [4] into the conjecture that if a subset of an abelian group does not contain 0 then it is sequenceable. If the elements of a sequenceable set A do not sum to 0 then there exists a simple path P in the Cayley graph Cay[G: A] such that (P) = A. In this paper, inspired by this graph-theoretical interpretation, we propose a weakening of this conjecture. Here, under the above assumptions, we want to find an ordering whose partial sums define a walk W of girth bigger than t (for a given t < k) and such that (W) = A. This is possible given that the partial sums si and sj are different whenever i and j are distinct and |i-j|≤ t. In this case, we say that the set A is t-weak sequenceable. The main result here presented is that any subset A of Zp \0\ is t-weak sequenceable whenever t<7 or when A does not contain pairs of type \x,-x\ and t<8.

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