Infinite highly arc transitive digraphs and universal covering digraphs
Copyright policy )Infinite highly arc transitive digraphs and universal covering digraphs
A digraph \(D\) is said to be \(s\)-arc transitive if its automorphism group is transitive on the set of \(s\)-arcs, and \(D\) is said to be highly arc transitive if it is \(s\)-arc transitive for all finite \(s\geq 0\). The authors give a few methods for obtaining new highly arc transitive digraphs from a given one. They attempt to characterize highly arc transitive digraphs in several ways, and they also study certain properties of these digraphs.
- University of Melbourne Australia
- Queen Mary University of London United Kingdom
- University of Western Australia Australia
highly arc transitive, Directed graphs (digraphs), tournaments, automorphism group, digraph, Graphs and abstract algebra (groups, rings, fields, etc.)
highly arc transitive, Directed graphs (digraphs), tournaments, automorphism group, digraph, Graphs and abstract algebra (groups, rings, fields, etc.)
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