Publication at Faculty of Mathematics and Physics |
2016
Abstract
Ruskey and Savage in 1993 asked whether every matching in a hypercube can be extended to a Hamiltonian cycle. A positive answer is known for perfect matchings, but the general case has been resolved only for matchings of linear size.
In this paper we show that there is a quadratic function q(n) such that every matching in the n-dimensional hypercube of size at most q(n) may be extended to a cycle which covers at least 3/4 of the vertices.