On Sum-Free Functions
Abstract
A function from F2n to F2n is said to be kth order sum-free if the sum of its values over each k-dimensional F2-affine subspace of F2n is nonzero. This notion was recently introduced by C. Carlet as, among other things, a generalization of APN functions. At the center of this new topic is a conjecture about the sum-freedom of the multiplicative inverse function f inv(x)=x-1 (with 0-1 defined to be 0). It is known that f inv is 2nd order (equivalently, (n-2)th order) sum-free if and only if n is odd, and it is conjectured that for 3 k n-3, f inv is never kth order sum-free. The conjecture has been confirmed for even n but remains open for odd n. In the present paper, we show that the conjecture holds under each of the following conditions: (1) n=13; (2) 3 n; (3) 5 n; (4) the smallest prime divisor l of n satisfies (l-1)(l+2) (n+1)/2. We also determine the ``right'' q-ary generalization of the binary multiplicative inverse function f inv in the context of sum-freedom. This q-ary generalization not only maintains most results for its binary version, but also exhibits some extraordinary phenomena that are not observed in the binary case.
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