Cycle action on treelike structures. (Q5919969)

The Parker sequence of a group \(G\) is the sequence whose \(k\)-th term is the number of orbits of \(G\) on the set of \(k\)-cycles appearing in its elements. Infinite permutation groups of countable degree having only finitely many orbits on \(k\)-sets for each \(k\) are known as oligomorphic groups. In this paper, the authors study tree like structures by calculating the Parker sequences of the automorphism group of a Fraise limit (which is oligomorphic) of the relevant class of relational structures and finite substructures of these admitting a cyclic automorphism.