Paper
Hamiltonicity of optimal 2-planar graphs
Authors
Licheng Zhang, Yuanqiu Huang, Zhangdong Ouyang
Abstract
A classical result of Tutte shows that every 4-connected planar graph is Hamiltonian. In recent years, there has been growing interest in extending classical Hamiltonian results from planar graphs to sparse graphs with drawings allowing crossings, such as -planar graphs, where each edge is crossed at most times. For example, using different approaches, Hudák, Tomáš and Suzuki, as well as Noguchi and Suzuki, independently proved that every optimal 1-planar graph is Hamiltonian. Here, an optimal 1-planar graph refers to one that attains the maximum possible number of edges. In this paper, we establish results on the Hamiltonicity of optimal 2-planar graphs, that is, 2-planar graphs with the maximum number of edges. More precisely, we show that every 4-connected optimal 2-planar graph is Hamiltonian-connected. With vertex-connectivity 3, there exist infinitely many optimal 2-planar graphs that are non-Hamiltonian.