On iterated product sets with shifts
Abstract
We prove that, for any finite set A ⊂ Q with |AA| ≤ K|A| and any positive integer k, the k-fold product set of the shift A+1 satisfies the bound | \(a1+1)(a2+1) ·s (ak+1) : ai ∈ A \| ≥ |A|k(8k4)kK. This result is essentially optimal when K is of the order c|A|, for a sufficiently small constant c=c(k). Our main tool is a multiplicative variant of the -constants used in harmonic analysis, applied to Dirichlet polynomials.
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