On the minisymposium problem
Abstract
The generalized Oberwolfach problem asks for a factorization of the complete graph into prescribed -factors and at most a -factor. When all -factors are pairwise isomorphic and is odd, we have the classic Oberwolfach problem, which was originally stated as a seating problem: given attendees at a conference with circular tables such that the th table seats people and , find a seating arrangement over the days of the conference, so that every person sits next to each other person exactly once. In this paper we introduce the related {\em minisymposium problem}, which requires a solution to the generalized Oberwolfach problem on vertices that contains a subsystem on vertices. That is, the decomposition restricted to the required vertices is a solution to the generalized Oberwolfach problem on vertices. In the seating context above, the larger conference contains a minisymposium of participants, and we also require that pairs of these participants be seated next to each other for of the days. When the cycles are as long as possible, i.e.\ , and , a flexible method of Hilton and Johnson provides a solution. We use this result to provide further solutions when and all cycle lengths are even. In addition, we provide extensive results in the case where all cycle lengths are equal to , solving all cases when , except possibly when is odd and is even.
Cite
@article{arxiv.2307.11246,
title = {On the minisymposium problem},
author = {Peter Danziger and Eric Mendelsohn and Brett Stevens and Tommaso Traetta},
journal= {arXiv preprint arXiv:2307.11246},
year = {2023}
}
Comments
25 pages