Sparse Kneser graphs are Hamiltonian

Abstract

For integers k≥ 1 and n≥ 2k+1, the Kneser graph K(n,k) is the graph whose vertices are the k-element subsets of \1,…,n\ and whose edges connect pairs of subsets that are disjoint. The Kneser graphs of the form K(2k+1,k) are also known as the odd graphs. We settle an old problem due to Meredith, Lloyd, and Biggs from the 1970s, proving that for every k≥ 3, the odd graph K(2k+1,k) has a Hamilton cycle. This and a known conditional result due to Johnson imply that all Kneser graphs of the form K(2k+2a,k) with k≥ 3 and a≥ 0 have a Hamilton cycle. We also prove that K(2k+1,k) has at least 22k-6 distinct Hamilton cycles for k≥ 6. Our proofs are based on a reduction of the Hamiltonicity problem in the odd graph to the problem of finding a spanning tree in a suitably defined hypergraph on Dyck words.