Average estimate for additive energy in prime field
Abstract
Assume that A⊂eq , B⊂eq *, \1/4≤slant|B||A|, |A|=pα, |B|=pβ. We will prove that for p≥slant p0(β) one has Σb∈ BE+(A, bA)≤slant 15 p-\β, 1-α\308|A|3|B|. Here E+(A, bA) is an additive energy between subset A and it's multiplicative shift bA. This improves previously known estimates of this type.
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