On strong Skolem starters for Zpq

Abstract

In 1991, N. Shalaby conjectured that any additive group Zn, where n1 or 3 (mod 8) and n ≥11, admits a strong Skolem starter and constructed these starters of all admissible orders 11≤ n≤57. Shalaby and et al. [O. Ogandzhanyants, M. Kondratieva and N. Shalaby, Strong Skolem Starters, J. Combin. Des. 27 (2018), no. 1, 5--21] was proved if n=i=1kpiαi, where pi is a prime number such that ord(2)pi 2 (mod 4) and αi is a non-negative integer, for all i=1,…,k, then Zn admits a strong Skolem starter. On the other hand, the author [A. V\'azquez-\'Avila, A note on strong Skolem starters, Discrete Math. Accepted] gives different families of strong Skolem starters for Zp than Shalaby et al, where p3 (mod 8) is an odd prime. Recently, the author [A. V\'azquez-\'Avila, New families of strong Skolem starters, Submitted] gives different families of strong Skolem starters of Zpn than Shalaby et al, where p3 (mod 8) and n is an integer greater than 1. In this paper, we gives some different families of strong Skolem starters of Zpq, where p,q3 (mod 8) are prime numbers such that p<q and (p-1)(q-1).