Abstract
We establish a sharp estimate for k-additive energies of subsets of the discrete hypercube conjectured by de Dios Pont, Greenfeld, Ivanisvili, and Madrid, which generalizes a result by Kane and Tao. This note proves the only missing ingredient, which is an elementary inequality for real numbers, previously verified only for k⩽100. We also give an interpretation of this inequality in terms of a lazy non-symmetric simple random walk on the integer lattice.
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