菲鲁兹巴赫特猜想

在数论中，菲鲁兹巴赫特猜想（Firoozbakht's conjecture 或 Firoozbakht conjecture^[1]^[2]）是数学上关于质数分布的一个猜想。该猜想以伊朗女数学家法丽德·菲鲁兹巴赫特（英语：Farideh Firoozbakht）的名字命名，她于1982年提出此猜想。

该猜想声称， $p_{n}^{1/n}$ 是一个严格递减函数（其中 $p_{n}$ 是第 $n$ 个质数），也就是说

{\sqrt[{n+1}]{p_{n+1}}}<{\sqrt[{n}]{p_{n}}}\qquad {\text{ for all }}n\geq 1.

或等价地

p_{n+1}<p_{n}^{1+{\frac {1}{n}}}\qquad {\text{ for all }}n\geq 1,

相关内容可见A182134及A246782。

借由使用最大质数间隙（maximal gap）表，法丽德·菲鲁兹巴赫特确认她的猜想对大到 $4.444\times 10^{12}$ 的数都成立。^[2]利用广度更大的最大质数间隙表，目前已知该猜想对任何小于 $2^{64}\sim 1.84\times 10^{19}$ 的质数都成立。^[3]^[4]

若此猜想成立，那么质数间隙函数 $g_{n}=p_{n+1}-p_{n}$ 会满足下列关系：^[5]

g_{n}<(\log p_{n})^{2}-\log p_{n}\qquad {\text{ for all }}n>4.

此外，^[6]

g_{n}<(\log p_{n})^{2}-\log p_{n}-1\qquad {\text{ for all }}n>9,

对此可见A111943。

该猜想是对质数间隙上界最强的猜想之一，甚至比克拉梅尔猜想和尚克斯猜想（Shanks' Conjecture）还强。^[4]从该猜想可推出强克拉梅尔猜想，而这与安德鲁·格兰维尔（英语：Andrew Granville）、平茨·亚诺什（匈牙利语：Pintz János）^[7]^[8]^[9]和赫尔穆特·迈尔（英语：Helmut Maier）等人的直观猜测不一致。^[10]^[11]而这些人的直观猜测认为，对任意的 $\varepsilon >0$ 下式对无限多的数成立：

g_{n}>{\frac {2-\varepsilon }{e^{\gamma }}}(\log p_{n})^{2}\approx 1.1229(\log p_{n})^{2},

其中 $\gamma$ 是欧拉-马斯刻若尼常数。

两个相关的猜想（可见A182514的讨论）如下：

比菲鲁兹巴赫特猜想来得弱的猜想：

\left({\frac {\log(p_{n+1})}{\log(p_{n})}}\right)^{n}<e,

比菲鲁兹巴赫特猜想来得强的猜想：

\left({\frac {p_{n+1}}{p_{n}}}\right)^{n}<n\log(n)\qquad {\text{ for all }}n>5,

参见

注解

^ Ribenboim, Paulo. The Little Book of Bigger Primes Second Edition . Springer-Verlag. 2004: 185. ISBN 9780387201696.
^ ^2.0 ^2.1 Rivera, Carlos. Conjecture 30. The Firoozbakht Conjecture. [22 August 2012].
^ Gaps between consecutive primes
^ ^4.0 ^4.1 Kourbatov, Alexei. Prime Gaps: Firoozbakht Conjecture.
^ Sinha, Nilotpal Kanti, On a new property of primes that leads to a generalization of Cramer's conjecture, 2010, arXiv:1010.1399  [math.NT] .
^ Kourbatov, Alexei, Upper bounds for prime gaps related to Firoozbakht's conjecture, Journal of Integer Sequences, 2015, 18 (Article 15.11.2), MR 3436186, Zbl 1390.11105, arXiv:1506.03042  .
^ Granville, A., Harald Cramér and the distribution of prime numbers (PDF), Scandinavian Actuarial Journal, 1995, 1: 12–28, MR 1349149, Zbl 0833.01018, doi:10.1080/03461238.1995.10413946, （原始内容 (PDF)存档于2016-05-02） .
^ Granville, Andrew, Unexpected irregularities in the distribution of prime numbers (PDF), Proceedings of the International Congress of Mathematicians, 1995, 1: 388–399, ISBN 978-3-0348-9897-3, Zbl 0843.11043, doi:10.1007/978-3-0348-9078-6_32 .
^ Pintz, János, Cramér vs. Cramér: On Cramér's probabilistic model for primes, Funct. Approx. Comment. Math., 2007, 37 (2): 232–471, MR 2363833, S2CID 120236707, Zbl 1226.11096, doi:10.7169/facm/1229619660 
^ Leonard Adleman（英语：Leonard Adleman） and Kevin McCurley, "Open Problems in Number Theoretic Complexity, II" (PS), Algorithmic number theory (Ithaca, NY, 1994), Lecture Notes in Comput. Sci. 877: 291–322, Springer, Berlin, 1994. doi:10.1007/3-540-58691-1_70. ISBN 978-3-540-58691-3.
^ Maier, Helmut, Primes in short intervals, The Michigan Mathematical Journal, 1985, 32 (2): 221–225, ISSN 0026-2285, MR 0783576, Zbl 0569.10023, doi:10.1307/mmj/1029003189

参考资料

Ribenboim, Paulo. The Little Book of Bigger Primes Second Edition. Springer-Verlag. 2004. ISBN 0-387-20169-6.
Riesel, Hans. Prime Numbers and Computer Methods for Factorization, Second Edition. Birkhauser. 1985. ISBN 3-7643-3291-3.

[Ribenboim-1] Ribenboim, Paulo. The Little Book of Bigger Primes Second Edition . Springer-Verlag. 2004: 185. ISBN 9780387201696.

[ppagc30-2] 2.0 ^2.1 Rivera, Carlos. Conjecture 30. The Firoozbakht Conjecture. [22 August 2012].

[3] Gaps between consecutive primes

[Kourbatov2018-4] 4.0 ^4.1 Kourbatov, Alexei. Prime Gaps: Firoozbakht Conjecture.

[5] Sinha, Nilotpal Kanti, On a new property of primes that leads to a generalization of Cramer's conjecture, 2010, arXiv:1010.1399  [math.NT] .

[6] Kourbatov, Alexei, Upper bounds for prime gaps related to Firoozbakht's conjecture, Journal of Integer Sequences, 2015, 18 (Article 15.11.2), MR 3436186, Zbl 1390.11105, arXiv:1506.03042  .

[7] Granville, A., Harald Cramér and the distribution of prime numbers (PDF), Scandinavian Actuarial Journal, 1995, 1: 12–28, MR 1349149, Zbl 0833.01018, doi:10.1080/03461238.1995.10413946, （原始内容 (PDF)存档于2016-05-02） .

[8] Granville, Andrew, Unexpected irregularities in the distribution of prime numbers (PDF), Proceedings of the International Congress of Mathematicians, 1995, 1: 388–399, ISBN 978-3-0348-9897-3, Zbl 0843.11043, doi:10.1007/978-3-0348-9078-6_32 .

[Pintz07-9] Pintz, János, Cramér vs. Cramér: On Cramér's probabilistic model for primes, Funct. Approx. Comment. Math., 2007, 37 (2): 232–471, MR 2363833, S2CID 120236707, Zbl 1226.11096, doi:10.7169/facm/1229619660 

[10] Leonard Adleman（英语：Leonard Adleman） and Kevin McCurley, "Open Problems in Number Theoretic Complexity, II" (PS), Algorithmic number theory (Ithaca, NY, 1994), Lecture Notes in Comput. Sci. 877: 291–322, Springer, Berlin, 1994. doi:10.1007/3-540-58691-1_70. ISBN 978-3-540-58691-3.

[11] Maier, Helmut, Primes in short intervals, The Michigan Mathematical Journal, 1985, 32 (2): 221–225, ISSN 0026-2285, MR 0783576, Zbl 0569.10023, doi:10.1307/mmj/1029003189 

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