PβN functions, complete mappings and quasigroup difference sets
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We investigate pairs of permutations F,G of π½_p^n such that F(x+a)-G(x) is a permutation for every aβπ½_p^n. We show that necessarily G(x) = β(F(x)) for some complete mapping -β of π½_p^n, and call the permutation F a perfect β nonlinear (PβN) function. If β(x) = cx, then F is a PcN function, which have been considered in the literature, lately. With a binary operation on π½_p^nΓπ½_p^n involving β, we obtain a quasigroup, and show that the graph of a PβN function F is a difference set in the respective quasigroup. We further point to variants of symmetric designs obtained from such quasigroup difference sets. Finally, we analyze an equivalence (naturally defined via the automorphism group of the respective quasigroup) for PβN functions, respectively, the difference sets in the corresponding quasigroup.
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