Abstract
For a graph Γ, a positive integer s and a subgroup G ≤ Aut(Γ), we prove that G is transitive on the set of s-arcs of γ if and only if Γ has girth at least 2(s - 1) and G is transitive on the set of (s - 1)-geodesics of its line graph. As applications, we first classify 2-geodesic transitive graphs of valency 4 and girth 3, and determine which of them are geodesic transitive. Secondly we prove that the only non-complete locally cyclic 2-geodesic transitive graphs are the octahedron and the icosahedron. Copyright © 2013 DMFA Slovenije.
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Devillers, A., Jin, W., Li, C. H., & Praeger, C. E. (2013). Line graphs and geodesic transitivity. Ars Mathematica Contemporanea, 6(1), 13–20. https://doi.org/10.26493/1855-3974.248.aae
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