On the central levels problem
Abstract
The central levels problem asserts that the subgraph of the -dimensional hypercube induced by all bitstrings with at least many 1s and at most many 1s, i.e., the vertices in the middle levels, has a Hamilton cycle for any and . This problem was raised independently by Buck and Wiedemann, Savage, by Gregor and \v{S}krekovski, and by Shen and Williams, and it is a common generalization of the well-known middle levels problem, namely the case , and classical binary Gray codes, namely the case . In this paper we present a general constructive solution of the central levels problem. Our results also imply the existence of optimal cycles through any sequence of consecutive levels in the -dimensional hypercube for any and . Moreover, extending an earlier construction by Streib and Trotter, we construct a Hamilton cycle through the -dimensional hypercube, , that contains the symmetric chain decomposition constructed by Greene and Kleitman in the 1970s, and we provide a loopless algorithm for computing the corresponding Gray code.
Keywords
Cite
@article{arxiv.1912.01566,
title = {On the central levels problem},
author = {Petr Gregor and Ondřej Mička and Torsten Mütze},
journal= {arXiv preprint arXiv:1912.01566},
year = {2021}
}