Consecutive primes and Beatty sequences
Abstract
Fix irrational numbers α,α>1 of finite type and real numbers β,β 0, and let B and B be the Beatty sequences B:=(α m+β)m 1 B:=(α m+β)m 1. In this note, we study the distribution of pairs (p,p) of consecutive primes for which p∈ B and p∈ B. Under a strong (but widely accepted) form of the Hardy-Littlewood conjectures, we show that |\p x:p∈ B and p∈ B\|=(αα)-1π(x)+O(x( x)-3/2+ε), where π(x) is the prime counting function.
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