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edited title

edited Jun 15, 2021 at 10:48

Đào Thanh Oai

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A generalization Bertrand's postulate

Let $n, k$ are integers number such that $1<n \le k$, does always exist a prime number between $kn$ and $k(n+1)$?
When $n=1, k>1$ always exist a prime number between $k$ and $2k$ the question was proved Bertrand's postulate

nt.number-theory analytic-number-theory prime-numbers prime-gaps

asked Jun 15, 2021 at 10:43

Đào Thanh Oai

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