Regular self-dual and self-Petrie-dual maps of arbitrary valency
Abstract
The main result of D. Archdeacon, M. Conder and J. Sir\'an [Trans. Amer. Math. Soc. 366 (2014) 8, 4491-4512] implies existence of a regular, self-dual and self-Petrie dual map of any given even valency. In this paper we extend this result to any odd valency 5. This is done by algebraic number theory and maps defined on the groups PSL(2,p) in the case of odd prime valency 5 and valency 9, and by coverings for the remaining odd valencies.
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