Density of non-residues in Burgess-type intervals and applications
Abstract
We show that for any fixed >0, there are numbers δ>0 and p0 2 with the following property: for every prime p p0 and every integer N such that p1/(4e)+ N p, the sequence 1,2,...,N contains at least δ N quadratic non-residues modulo p. We use this result to obtain strong upper bounds on the sizes of the least quadratic non-residues in Beatty and Piatetski--Shapiro sequences.
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