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A Power Law Governing Prime Gaps

DOI: 10.4236/oalib.1102989, PP. 1-7

Subject Areas: Number Theory, Applied Statistical Mathematics

Keywords: Prime Numbers, Power Laws, Prime Gaps, k-Tuple Conjecture, Number Theory

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Abstract

A prime gap is the difference between two successive prime numbers. Prime gaps are casually thought to occur randomly. However, the “k-tuple conjecture” suggests that prime gaps are non-random by estimating how often pairs, triples and larger groupings of primes will appear. The k-tuple conjecture is yet to be proven, but a very recent work presents a result that contributes to a confirmation of the k-tuple conjecture by finding unexpected biases in the distribution of consecutive primes. Here, we present another contribution to confirmation of the k-tuple conjecture based on statistical physics. The pattern we find comes in the form of a power law in the distribution of prime gaps. We find that prime gaps are proportional to the inverse of the chance of a number to be prime.

Cite this paper

Matsushita, R. and Silva, S. D. (2016). A Power Law Governing Prime Gaps. Open Access Library Journal, 3, e2989. doi: http://dx.doi.org/10.4236/oalib.1102989.

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