Small cycles, generalized prisms and Hamiltonian cycles in the Bubble-sort graph

Abstract

The Bubble-sort graph BSn,\,n≥slant 2, is a Cayley graph over the symmetric group Symn generated by transpositions from the set \(1 2), (2 3),…, (n-1 n)\. It is a bipartite graph containing all even cycles of length , where 4≤slant ≤slant n!. We give an explicit combinatorial characterization of all its 4- and 6-cycles. Based on this characterization, we define generalized prisms in BSn,\,n≥slant 5, and present a new approach to construct a Hamiltonian cycle based on these generalized prisms.