Connected components of the graph generated by power maps in prime finite fields

Abstract

Consider the power pseudorandom-number generator in a finite field Fq. That is, for some integer e2, one considers the sequence u,ue,ue2,… in Fq for a given seed u∈ Fq×. This sequence is eventually periodic. One can consider the number of cycles that exist as the seed u varies over Fq×. This is the same as the number of cycles in the functional graph of the map x xe in Fq×. We prove some estimates for the maximal and average number of cycles in the case of prime finite fields.