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Whitney proved that 3-connected planar graphs can be embedded uniquely on the sphere. In general, such a graph may also have embeddings on different surfaces. Enami focused on cubic graphs and showed that a 3-connected cubic planar graph can be re-embedded on a surface of non-negative Euler characteristic if and only if the dual graph contains a specific subgraph. Motivated by applications to triangulated surfaces, we investigate strong re-embeddings and show that these are characterised by a subset of Enami's subgraphs. Additionally, we provide criteria for when a graph does not possess a strong re-embedding on the projective plane, the torus or the Klein bottle.
Weiß et al. (Thu,) studied this question.