A generalization of the Goresky-Klapper conjecture, Part II

Abstract

Suppose that f(x)=Axk mod p is a permutation of the least residues mod p. With the exception of the maps f(x)=Ax and Ax(p+1)/2 mod p we show that for fixed n≥ 2 the image of each residue class mod n contains elements from every residue classe mod n, once p is sufficiently large. If f(x)=Ax mod p, then for each p and n there will be exactly (1+o(1))6π2n2 readily describable values of A for which the image of some residue class mod n misses at least one residue class mod n, even when p is large relative to n. A similar situation holds for f(x)=Ax(p+1)/2 mod p.