Long paths and cycles in subgraphs of the cube

Abstract

Let Qn denote the graph of the n-dimensional cube with vertex set \0,1\n in which two vertices are adjacent if they differ in exactly one coordinate. Suppose G is a subgraph of Qn with average degree at least d. How long a path can we guarantee to find in G? Our aim in this paper is to show that G must contain an exponentially long path. In fact, we show that if G has minimum degree at least d then G must contain a path of length 2d-1. Note that this bound is tight, as shown by a d-dimensional subcube of Qn. We also obtain the slightly stronger result that G must contain a cycle of length at least 2d and prove analogous results for other `product-type' graphs.