Embedding a Praeger-Xu graph into a surface
Abstract
Rotary maps (orientably regular maps) are highly symmetric graph embeddings on orientable surfaces. This paper classifies all rotary maps whose underlying graphs are Praeger-Xu graphs, denoted C(p,r,s), for any odd prime p that does not divide r. Our main result establishes a one-to-one correspondence between the isomorphism classes of these maps and the multiplicity-free representations of the dihedral group D2r over the finite field Fp. This work extends a recent classification for the case where p=2.
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