Permutation Designs and Sequencing Highly Transitive Group Actions
Abstract
We consider an experimental design problem for permutations: given a fixed set , and an integer , construct a list of permutations of such that every ordered -tuple of distinct elements of occurs as a consecutive subsequence of exactly one permutation in . In this paper we focus on solutions based on sharply transitive group actions, in effect generalizing Gordon's notion of group sequencing. We give an explicit construction when is prime for the case , and analyze a branching algorithm for the general case which produces, for example, a rare design with based on the Mathieu group , and suggests that every sharply transitive group action leads to a solution, apart from an explicit list of counterexamples. We state a number of conjectures and indicate directions for future work.
Cite
@article{arxiv.2110.04973,
title = {Permutation Designs and Sequencing Highly Transitive Group Actions},
author = {Tad White},
journal= {arXiv preprint arXiv:2110.04973},
year = {2021}
}
Comments
17 pages