Sequencings in Semidirect Products via the Polynomial Method

Abstract

The partial sums of a sequence x = x1, x2, …, xk of distinct non-identity elements of a group (G,·) are s0 = idG and sj = Πi=1j xi for 0 < j ≤ k. If the partial sums are all different then x is a linear sequencing and if the partial sums are all different when |i-j| ≤ t then x is a t-weak sequencing. We investigate these notions of sequenceability in semidirect products using the polynomial method. We show that every subset of order k of the non-identity elements of the dihedral group of order 2m has a linear sequencing when k ≤ 12 and either m>3 is prime or every prime factor of m is larger than k!, unless sk is unavoidably the identity; that every subset of order k of a non-abelian group of order three times a prime has a linear sequencing when 5 < k ≤ 10, unless sk is unavoidably the identity; and that if the order of a group is pe then all sufficiently large subsets of the non-identity elements are t-weakly sequenceable when p>3 is prime, e ≤ 3 and t ≤ 6.