Good sequencings for small directed triple systems
Abstract
A directed triple system of order v (or, DTS(v)) is a decomposition of the complete directed graph Kv into transitive triples. An -good sequencing of a DTS(v) is a permutation of the points of the design, say [x1 \; ·s \; xv], such that, for every triple (x,y,z) in the design, it is not the case that x = xi, y = xj and z = xk with i < j < k and k-i+1 ≤ . In this report we provide a maximum -good sequencing for each DTS(v), v ≤ 7.
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