On Products of Shifts in Arbitrary Fields
Abstract
We adapt the approach of Rudnev, Shakan, and Shkredov to prove that in an arbitrary field F, for all A ⊂ F finite with |A| < p1/4 if p:= Char(F) is positive, we have |A(A+1)| |A|11/9, |AA| + |(A+1)(A+1)| |A|11/9. This improves upon the exponent of 6/5 given by an incidence theorem of Stevens and de Zeeuw.
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