Lines in the prime number graph
Abstract
The prime number graph is the set of points (n,pn) where pn denotes the n th prime. Let L(n) be the minimum number of straight line segments needed to cover the first n points in this set. Let B(n) be the largest number of points (k,pk) with k n covered by a single line. Recently Sloane conjectured that L(n) = O(n/ n). We show that L(n)=O(n n / n) and B(n) c n for a constant c>0 and all large n. Under RH we show that for large n we have B(n)=O(n3/4( n)1/2) and L(n) c' n1/4 ( n) -1/2 for some constant c'>0.
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