Bounds on the genus for 2-cell embeddings of prefix-reversal graphs

Abstract

In this paper, we provide bounds for the genus of the pancake graph Pn, burnt pancake graph BPn, and undirected generalized pancake graph Pm(n). Our upper bound for Pn is sharper than the previously-known bound, and the other bounds presented are the first of their kind. Our proofs are constructive and rely on finding an appropriate rotation system (also referred to in the literature as Edmonds' permutation technique) where certain cycles in the graphs we consider become boundaries of regions of a 2-cell embedding. A key ingredient in the proof of our bounds for the genus Pn and BPn is a labeling algorithm of their vertices that allows us to implement rotation systems to bound the number of regions of a 2-cell embedding of said graphs. All of our bounds are asymptotically tight; in particular, the genus of Pm(n) is (mnnn!) for all m≥1 and n≥2.