A generalization of the Goresky-Klapper conjecture, Part I
Abstract
For a fixed integer n≥ 2, we show that a permutation of the least residues mod p of the form f(x)=Axk mod p cannot map a residue class mod n to just one residue class mod n once p is sufficiently large, other than the maps f(x)= x mod p when n is even and f(x)= x or x(p+1)/2 mod p when n is odd.
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