A note on asymmetric hypergraphs
Abstract
A k-graph G is asymmetric if there does not exist an automorphism on G other than the identity, and G is called minimal asymmetric if it is asymmetric but every non-trivial induced sub-hypergraph of G is non-asymmetric. Extending a result of Jiang and Nesetril, we show that for every k-graph, k3, there exist infinitely many minimal asymmetric k-graphs which have maximum degree 2 and are linear. Further, we show that there are infinitely many 2-regular asymmetric k-graphs for k3.
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