primecount(1)

1PRIMECOUNT(1)                                                    PRIMECOUNT(1)
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NAME

6       primecount - count prime numbers
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SYNOPSIS

9       primecount x [options]
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DESCRIPTION

12       Count the number of primes less than or equal to x (<= 10^31) using
13       fast implementations of the combinatorial prime counting function
14       algorithms. By default primecount counts primes using Xavier Gourdon’s
15       algorithm which has a runtime complexity of O(x^(2/3) / log^2 x)
16       operations and uses O(x^(2/3) * log^3 x) memory. primecount is
17       multi-threaded, it uses all available CPU cores by default.
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OPTIONS

20       -d, --deleglise-rivat
21           Count primes using the Deleglise-Rivat algorithm.
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23       -g, --gourdon
24           Count primes using Xavier Gourdon’s algorithm (default algorithm).
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26       -l, --legendre
27           Count primes using Legendre’s formula.
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29       --lehmer
30           Count primes using Lehmer’s formula.
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32       --lmo
33           Count primes using the Lagarias-Miller-Odlyzko algorithm.
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35       -m, --meissel
36           Count primes using Meissel’s formula.
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38       --Li
39           Approximate pi(x) using the logarithmic integral.
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41       --Li-inverse
42           Approximate the nth prime using Li^-1(x).
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44       -n, --nth-prime
45           Calculate the nth prime.
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47       -p, --primesieve
48           Count primes using the sieve of Eratosthenes.
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50       --phi X A
51           phi(x, a) counts the numbers <= x that are not divisible by any of
52           the first a primes.
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54       --Ri
55           Approximate pi(x) using the Riemann R function.
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57       --Ri-inverse
58           Approximate the nth prime using Ri^-1(x).
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60       -s, --status[=NUM]
61           Show the computation progress e.g. 1%, 2%, 3%, ... Show NUM digits
62           after the decimal point: --status=1 prints 99.9%.
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64       --test
65           Run various correctness tests and exit.
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67       --time
68           Print the time elapsed in seconds.
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70       -t, --threads=NUM
71           Set the number of threads, 1 <= NUM <= CPU cores. By default
72           primecount uses all available CPU cores.
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74       -v, --version
75           Print version and license information.
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77       -h, --help
78           Print this help menu.
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ADVANCED OPTIONS FOR THE DELEGLISE-RIVAT ALGORITHM

81       --P2
82           Compute the 2nd partial sieve function.
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84       --S1
85           Compute the ordinary leaves.
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87       --S2-trivial
88           Compute the trivial special leaves.
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90       --S2-easy
91           Compute the easy special leaves.
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93       --S2-hard
94           Compute the hard special leaves.
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96   Tuning factor
97       The alpha tuning factor mainly balances the computation of the S2_easy
98       and S2_hard formulas. By increasing alpha the runtime of the S2_hard
99       formula will usually decrease but the runtime of the S2_easy formula
100       will increase. For large pi(x) computations with x >= 10^25 you can
101       usually achieve a significant speedup by increasing alpha.
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103       The alpha tuning factor is also very useful for verifying pi(x)
104       computations. You compute pi(x) twice but for the second computation
105       you use a slightly different alpha factor. If the results of both pi(x)
106       computations match then pi(x) has been verified successfully.
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108       -a, --alpha=NUM
109           Set the alpha tuning factor: y = x^(1/3) * alpha, 1 <= alpha <=
110           x^(1/6).
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ADVANCED OPTIONS FOR XAVIER GOURDON’S ALGORITHM

113       --AC
114           Compute the A + C formulas.
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116       --B
117           Compute the B formula.
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119       --D
120           Compute the D formula.
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122       --Phi0
123           Compute the Phi0 formula.
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125       --Sigma
126           Compute the 7 Sigma formulas.
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128   Tuning factors
129       The alpha_y and alpha_z tuning factors mainly balance the computation
130       of the A, B, C and D formulas. When alpha_y is decreased but alpha_z is
131       increased then the runtime of the B formula will increase but the
132       runtime of the A, C and D formulas will decrease. For large pi(x)
133       computations with x >= 10^25 you can usually achieve a significant
134       speedup by decreasing alpha_y and increasing alpha_z. For convenience
135       when you increase alpha_z using --alpha-z=NUM then alpha_y is
136       automatically decreased.
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138       Both the alpha_y and alpha_z tuning factors are also very useful for
139       verifying pi(x) computations. You compute pi(x) twice but for the
140       second computation you use a slightly different alpha_y or alpha_z
141       factor. If the results of both pi(x) computations match then pi(x) has
142       been verified successfully.
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144       --alpha-y=NUM
145           Set the alpha_y tuning factor: y = x^(1/3) * alpha_y, 1 <= alpha_y
146           <= x^(1/6).
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148       --alpha-z=NUM
149           Set the alpha_z tuning factor: z = y * alpha_z, 1 <= alpha_z <=
150           x^(1/6).
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EXAMPLES

153       primecount 1000
154           Count the primes <= 1000.
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156       primecount 1e17 --status
157           Count the primes <= 10^17 and print status information.
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159       primecount 1e15 --threads 1 --time
160           Count the primes <= 10^15 using a single thread and print the time
161           elapsed.
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HOMEPAGE

164       https://github.com/kimwalisch/primecount
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AUTHOR

167       Kim Walisch <kim.walisch@gmail.com>
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171                                  03/20/2021                     PRIMECOUNT(1)