The origin of the logarithmic integral in the prime number theorem
We establish why li(x) outperforms x/log x as an estimate for the prime counting function pi(x). The result follows from subdividing the natural numbers into the intervals s_k :={p_k^2,..., p_{k+1}^2-1}, k>=1, each being fully sieved by the k first primes {p_1,..., p_k}. Denoting the number of pr...
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| Main Author | |
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| Format | Journal Article |
| Language | English |
| Published |
30.09.2013
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| Subjects | |
| Online Access | Get full text |
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| Summary: | We establish why li(x) outperforms x/log x as an estimate for the prime
counting function pi(x). The result follows from subdividing the natural
numbers into the intervals s_k :={p_k^2,..., p_{k+1}^2-1}, k>=1, each being
fully sieved by the k first primes {p_1,..., p_k}. Denoting the number of
primes in s_k by pi_k, we show that pi_k |s_k|/log p_{k+1}^2 and that pi(x)
li(x) originates as a continuum approximation of the sum sum_k pi_k. In
contrast, pi(x) x/log x stems from sieving repeatedly in regions already
completed---explaining why x/log x underestimates pi(x). The explanatory
potential arising from defining s_k appears promising, evidenced in the last
section where we outline further research. |
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| DOI: | 10.48550/arxiv.1311.1093 |