The cycle polynomial of a permutation group

Abstract

The cycle polynomial of a finite permutation group G is the generating function for the number of elements of G with a given number of cycles: \[FG(x) = Σg∈ Gxc(g),\] where c(g) is the number of cycles of g on . In the first part of the paper, we develop basic properties of this polynomial, and give a number of examples. In the 1970s, Richard Stanley introduced the notion of reciprocity for pairs of combinatorial polynomials. We show that, in a considerable number of cases, there is a polynomial in the reciprocal relation to the cycle polynomial of G; this is the orbital chromatic polynomial of and G, where is a G-invariant graph, introduced by the first author, Jackson and Rudd. We pose the general problem of finding all such reciprocal pairs, and give a number of examples and characterisations: the latter include the cases where is a complete or null graph or a tree. The paper concludes with some comments on other polynomials associated with a permutation group.