An Explicit Result for Primes Between Cubes
Abstract
We prove that there is a prime between n3 and (n+1)3 for all n ≥ ((33.217)). Our new tool which we derive is a version of Landau's explicit formula for the Riemann zeta-function with explicit bounds on the error term. We use this along with other recent explicit estimates regarding the zeroes of the Riemann zeta-function to obtain the result. Furthermore, we show that there is a prime between any two consecutive mth powers for m ≥ 4.971 × 109.
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