On the central levels problem

TL;DR

This paper provides a constructive solution to the central levels problem, demonstrating Hamilton cycles in middle levels of hypercubes and extending Gray code constructions with an efficient algorithm.

Contribution

It introduces a general constructive method for Hamilton cycles in hypercube middle levels, extending previous results and algorithms.

Findings

Existence of Hamilton cycles in middle levels of hypercubes.

Construction of Gray codes containing Greene and Kleitman's chain decomposition.

Loopless algorithm for generating the corresponding Gray code.

Abstract

The central levels problem asserts that the subgraph of the $(2m+1)$-dimensional hypercube induced by all bitstrings with at least $m+1-\ell$ many 1s and at most $m+\ell$ many 1s, i.e., the vertices in the middle $2\ell$ levels, has a Hamilton cycle for any $m\geq 1$ and $1\le \ell\le m+1$. 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 $\ell=1$, and classical binary Gray codes, namely the case $\ell=m+1$. 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 $\ell$ consecutive levels in the $n$-dimensional hypercube for any $n\ge 1$ and $1\le \ell \le n+1$. Moreover, extending an earlier construction by Streib and Trotter, we construct a Hamilton cycle through the $n$-dimensional hypercube, $n\geq 2$, 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.