Biembeddings of Archdeacon type: their full automorphism group and their number
Abstract
Archdeacon, in his seminal paper [1], defined the concept of Heffter array in order to provide explicit constructions of Zv-regular biembeddings of complete graphs Kv into orientable surfaces. In this paper, we first introduce the quasi-Heffter arrays as a generalization of the concept of Heffer array and we show that, in this context, we can define a 2-colorable embedding of Archdeacon type of the complete multipartite graph Kvt× t into an orientable surface. Then, our main goal is to study the full automorphism groups of these embeddings: here we are able to prove, using a probabilistic approach, that, almost always, this group is exactly Zv. As an application of this result, given a positive integer t 04, we prove that there are, for infinitely many pairs of v and k, at least (1-o(1)) (v-t2)!φ(v) non-isomorphic biembeddings of Kvt× t whose face lengths are multiples of k. Here φ(·) denotes the Euler's totient function. Moreover, in case t=1 and v is a prime, almost all these embeddings define faces that are all of the same length kv, i.e. we have a more than exponential number of non-isomorphic kv-gonal biembeddings of Kv.
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