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P-Dop P-Dop

Source: ISL 2020 N4

July 20, 2021
number theoryIMO ShortlistIMO Shortlist 2020Sequence

Problem Statement

For any odd prime pp and any integer n,n, let dp(n){0,1,,p1}d_p (n) \in \{ 0,1, \dots, p-1 \} denote the remainder when nn is divided by p.p. We say that (a0,a1,a2,)(a_0, a_1, a_2, \dots) is a p-sequence, if a0a_0 is a positive integer coprime to p,p, and an+1=an+dp(an)a_{n+1} =a_n + d_p (a_n) for n0.n \geqslant 0. (a) Do there exist infinitely many primes pp for which there exist pp-sequences (a0,a1,a2,)(a_0, a_1, a_2, \dots) and (b0,b1,b2,)(b_0, b_1, b_2, \dots) such that an>bna_n >b_n for infinitely many n,n, and bn>anb_n > a_n for infinitely many n?n? (b) Do there exist infinitely many primes pp for which there exist pp-sequences (a0,a1,a2,)(a_0, a_1, a_2, \dots) and (b0,b1,b2,)(b_0, b_1, b_2, \dots) such that a0<b0,a_0 <b_0, but an>bna_n >b_n for all n1?n \geqslant 1?
[I]United Kingdom
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