Strong Skolem Starters
Abstract
This paper concerns a class of combinatorial objects called Skolem starters, and more specifically, strong Skolem starters, which are generated by Skolem sequences. In 1991, Shalaby conjectured that any additive group Zn, where n1 or 38,\ n11, admits a strong Skolem starter and constructed these starters of all admissible orders 11 n57. Only finitely many strong Skolem starters have been known to date. In this paper, we offer a geometrical interpretation of strong Skolem starters and explicitly construct infinite families of them.
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