论文信息 - Laced Boolean functions and subset sum problems in finite fields

Laced Boolean functions and subset sum problems in finite fields

In this paper, we investigate some algebraic and combinatorial properties of a special Boolean function on n variables, defined using weighted sums in the residue ring modulo the least prime p>=n. We also give further evidence relating to a question raised by Shparlinski regarding this function, by computing accurately the Boolean sensitivity, thus settling the question for prime number values p=n. Finally, we propose a generalization of these functions, which we call laced functions, and compute the weight of one such, for every value of n.

Sugata Gangopadhyay | Pantelimon Stanica | Subhamoy Maitra | David Canright

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