Super-symmetric maps from dihedral groupsGyürki, Štefan (Avtor) Hrivová, Ivona (Avtor) Pavlíková, Soňa (Avtor) regular mapdualityexponentsuper-symmetryIn 1976, S. Wilson proposed to study a family of regular self-dual and self-Petrie-dual maps arising from groups of order 8n^3 defined by a specific presentation. Later on, in 2014, D. Archdeacon, M. Conder and J. Širáň proved that these maps are super-symmetric, that is, not only exhibiting all self-dualities but also all admissible exponents. Furthermore, in 2016, G. A. Jones suggested that it should be possible to obtain the same family by the means of a parallel product of maps arising from 2-extensions of dihedral groups of order 2n. In this paper we verify this suggestion for odd values of n; for even n we show that the parallel product construction gives maps that are quotients of Wilson’s maps by a normal subgroup of order 2.Založba Univerze na Primorskem20252025-10-21 23:09:43Članek v reviji21998UDK: 51eISSN: 1855-3974DOI: https://doi.org/10.26493/1855-3974.3078.b06sl