Bounded Degree Spanners of the Hypercube

Abstract

In this short note we study two questions about the existence of subgraphs of the hypercube Qn with certain properties. The first question, due to Erdos--Hamburger--Pippert--Weakley, asks whether there exists a bounded degree subgraph of Qn which has diameter n. We answer this question by giving an explicit construction of such a subgraph with maximum degree at most 120. The second problem concerns properties of k-additive spanners of the hypercube, that is, subgraphs of Qn in which the distance between any two vertices is at most k larger than in Qn. Denoting by k,∞(n) the minimum possible maximum degree of a k-additive spanner of Qn, Arizumi--Hamburger--Kostochka showed that n ne-4k≤ 2k,∞(n)≤ 20n n n. We improve their upper bound by showing that 2k,∞(n)≤ 104k n n(k+1)n,where the last term denotes a k+1-fold iterated logarithm.