The Cayley Isomorphism Property for Cayley Maps

نویسندگان

  • Mikhail E. Muzychuk
  • Gabor Somlai
چکیده

The Cayley Isomorphism property for combinatorial objects was introduced by L. Babai in 1977. Since then it has been intensively studied for binary relational structures: graphs, digraphs, colored graphs etc. In this paper we study this property for oriented Cayley maps. A Cayley map is a Cayley graph provided by a cyclic rotation of its connection set. If the underlying graph is connected, then the map is an embedding of a Cayley graph into an oriented surface with the same cyclic rotation around every vertex. Two Cayley maps are called Cayley isomorphic if there exists a map isomorphism between them which is a group isomorphism too. We say that a finite group H is a CIM-group1 if any two Cayley maps over H are isomorphic if and only if they are Cayley isomorphic. The paper contains two main results regarding CIM-groups. The first one provides necessary conditons for being a CIM-group. It shows that a CIM-group should be one of the following Zm × Z2, Zm × Z4, Zm × Z8, Zm ×Q8, Zm o Z2e , e = 1, 2, 3, where m is an odd square-free number and r a non-negative integer2. Our second main result shows that the groups Zm × Z2, Zm × Z4, Zm × Q8 contained in the above list are indeed CIM-groups.

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عنوان ژورنال:
  • Electr. J. Comb.

دوره 25  شماره 

صفحات  -

تاریخ انتشار 2018