New bounds for (weak) sequenceability in Zk

Abstract

A famous conjecture of Graham asserts that every set A ⊂eq Zp \0\ can be ordered so that all partial sums are distinct. Although this conjecture was recently proved for sufficiently large primes by Pham and Sauermann in [16], it remains open for general abelian groups, even in the cyclic case Zk. For cyclic groups, the best known result is due to Bedert and Kravitz in [4], who proved - using a rectification and a two-step probabilistic approach - that the conjecture holds for any subset A ⊂eq Zk \0\ such that |A| \!(c( p)1/4), for some constant c>0, where p denotes the least prime divisor of k. In this paper, we improve their bound using a rectification argument again, followed by a one-shot probabilistic approach, showing that the conjecture holds whenever |A| \!(c( p)1/3), thus improving the exponent 1/4 from [4]. Moreover, the same one-shot approach adapts to the t-weak setting: by imposing all local constraints at once and applying the Lov\'asz Local Lemma, we obtain the existence of a t-weak sequencing whenever t \!(c( p)1/4).