On 3-Connected Cubic Planar Graphs and their Strong Embeddings on Orientable Surfaces

Abstract

Although the strong embedding of a 3-connected planar graph G on the sphere is unique, G can have different inequivalent strong embeddings on a surface of positive genus. If G is cubic, then the strong embeddings of G on the projective plane, the torus and the Klein bottle each are in one-to-one correspondence with certain subgraphs of the dual graph G. Here, we exploit this characterisation and show that two strong embeddings of G on the projective plane, the torus or the Klein bottle are isomorphic if and only if the corresponding subgraphs of G are contained in the same orbit under Aut(G). This allows us to construct a data base containing all isomorphism classes of strong embeddings on the projective plane, the torus and the Klein bottle of all 3-connected cubic planar graphs with up to 22 vertices. Moreover, we establish that cyclically 4-edge connected cubic planar graphs can be strongly embedded on orientable surfaces of positive genera. We use this to show that a 3-connected cubic planar graph has no strong embedding on orientable surfaces of positive genera if and only if it is the dual of an Apollonian network.