📝 SummarXiv

Abstract

In this paper, we provide a partial classification of Cartesian products of graphs that embed on the torus where one factor is $3$-connected. We show that if $G \square H$ embeds on the torus and $G$ is $3$-connected, then $H$ must be a path on two vertices, $P_2$, and we provide significant evidence that $G$ must be outer-cylindrical. At the same time, we show that if $G$ is outer-cylindrical, then $G \square P_2$ embeds on the torus. This all leads us to conjecture that if $G$ is $3$-connected then $G \square H$ embeds on the torus if and only if $G$ is outer-cylindrical and $H = P_2$. We also determine the genera of $K_{4} \square P_{3}$ and $H_i \square P_2$ where $H_i$ is a planar, $3$-connected, non-outer-cylindrical graph derived from a wheel graph $W_i$ via two vertex splits and one edge addition.