Additive energies on discrete cubes

Abstract

We prove that for d≥ 0 and k≥ 2, for any subset A of a discrete cube \0,1\d, the k-higher energy of A (the number of 2k-tuples (a1,a2,…,a2k) in A2k with a1-a2=a3-a4=…=a2k-1-a2k) is at most |A|2(2k+2), and 2(2k+2) is the best possible exponent. We also show that if d≥ 0 and 2≤ k≤ 10, for any subset A of a discrete cube \0,1\d, the k-additive energy of A (the number of 2k-tuples (a1,a2,…,a2k) in A2k with a1+a2+…+ak=ak+1+ak+2+…+a2k) is at most |A|2 2kk, and 2 2kk is the best possible exponent. We discuss the analogous problems for the sets \0,1,…,n\d for n≥ 2.

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