1,1

This value of K is conjectured to be the least possible such that there is at least one prime in the range n^k and (n+1)^k for all n>0 and k>=K. This value of K was found using exact interval arithmetic. For each n <= 300 and for each prime p in the range n to n^2, we computed an interval k(n,p) such that p is between n^k(n,p) and (n+1)^k(n,p). The intersection of all these intervals produces a list of 29 intervals. The last interval appears to be semi-infinite beginning with K, which is log(127)/log(16). See A143898 for the smallest number in the first interval.

My UBASIC program indicates no prime between 113.457 ... and 126.999 .... Next prime > 113 is 127. I would like someone to check this. [From Enoch Haga (Enokh(AT)comcast.net), Sep 24 2008]

T. D. Noe, Table of n, a(n) for n=1..10000

k= 1.74717117169304146332; Table[Length[Select[Range[Ceiling[n^k], Floor[(n+1)^k]], PrimeQ]], {n, 150}]

A014085 (number of primes between n^2 and (n+1)^2)

Sequence in context: A085035 A083023 A084359 this_sequence A008616 A097471 A025868

Adjacent sequences: A143932 A143933 A143934 this_sequence A143936 A143937 A143938

nonn

T. D. Noe (noe(AT)sspectra.com), Sep 05 2008

Corrected a(15) from 1 to 0 Enoch Haga (Enokh(AT)comcast.net), Sep 24 2008

My intention was to include the endpoints of the range. Using k=log(127)/log(16), the endpoint for n=15 is exactly 127, which is prime. - T. D. Noe (noe(AT)sspectra.com), Sep 25 2008