Large gaps between consecutive prime numbers
Abstract
Let G(X) denote the size of the largest gap between consecutive primes below X. Answering a question of Erdos, we show that G(X) ≥ f(X) X X X( X)2, where f(X) is a function tending to infinity with X. Our proof combines existing arguments with a random construction covering a set of primes by arithmetic progressions. As such, we rely on recent work on the existence and distribution of long arithmetic progressions consisting entirely of primes.
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