Python3 API for the C++ Random Library
Project description
Random Number Generator Engine for Python3
- Compiled Python3 API for the C++ Random Library.
- Designed for python developers familiar with C++ random library.
- Warning: RNG is not suitable for cryptography or secure hashing.
Sister Projects:
- Fortuna: Collection of tools to make custom random value generators. https://pypi.org/project/Fortuna/
- Pyewacket: Drop-in replacement for the Python3 random module. https://pypi.org/project/Pyewacket/
- MonkeyScope: Framework for testing non-deterministic generators. https://pypi.org/project/MonkeyScope/
Support these and other random projects: https://www.patreon.com/robertsharp
Quick Install
$ pip install RNG
$ python3
>>> import RNG ...
Installation may require the following:
- Python 3.6 or later with dev tools (setuptools, pip, etc.)
- Cython:
pip install Cython
- Modern C++17 compiler and standard library for your platform.
RNG Specifications
Random Boolean
RNG.bernoulli_variate(ratio_of_truth: float) -> bool
- Produces a Bernoulli distribution of boolean values.
- @param ratio_of_truth :: the probability of True. Expected input range:
[0.0, 1.0]
, clamped. - @return :: True or False
Random Integer
RNG.uniform_int_variate(left_limit: int, right_limit: int) -> int
- Flat uniform distribution.
- 20x faster than random.randint()
- @param left_limit :: input A.
- @param right_limit :: input B.
- @return :: random integer in the inclusive range
[A, B]
or[B, A]
if B < A
RNG.binomial_variate(number_of_trials: int, probability: float) -> int
- Based on the idea of flipping a coin and counting how many heads come up after some number of flips.
- @param number_of_trials :: how many times to flip a coin.
- @param probability :: how likely heads will be flipped. 0.5 is a fair coin. 1.0 is a double headed coin.
- @return :: count of how many heads came up.
RNG.negative_binomial_variate(trial_successes: int, probability: float) -> int
- Based on the idea of flipping a coin as long as it takes to succeed.
- @param trial_successes :: the required number of heads flipped to succeed.
- @param probability :: how likely heads will be flipped. 0.50 is a fair coin.
- @return :: the count of how many tails came up before the required number of heads.
RNG.geometric_variate(probability: float) -> int
- Same as random_negative_binomial(1, probability).
RNG.poisson_variate(mean: float) -> int
- @param mean :: sets the average output of the function.
- @return :: random integer, poisson distribution centered on the mean.
Random Floating Point
RNG.generate_canonical() -> float
- Evenly distributes floats of maximum precision.
- @return :: random float in range (0.0, 1.0)
RNG.uniform_real_variate(left_limit: float, right_limit: float) -> float
- Flat uniform distribution of floats.
- @return :: random Float between left_limit and right_limit.
RNG.normal_variate(mean: float, std_dev: float) -> float
- @param mean :: sets the average output of the function.
- @param std_dev :: standard deviation. Specifies spread of data from the mean.
RNG.lognormal_variate(log_mean: float, log_deviation: float) -> float
- @param log_mean :: sets the log of the mean of the function.
- @param log_deviation :: log of the standard deviation. Specifies spread of data from the mean.
RNG.exponential_variate(lambda_rate: float) -> float
- Produces random non-negative floating-point values, distributed according to probability density function.
- @param lambda_rate :: λ constant rate of a random event per unit of time/distance.
- @return :: The time/distance until the next random event. For example, this distribution describes the time between the clicks of a Geiger counter or the distance between point mutations in a DNA strand.
RNG.gamma_variate(shape: float, scale: float) -> float
- Generalization of the exponential distribution.
- Produces random positive floating-point values, distributed according to probability density function.
- @param shape :: α the number of independent exponentially distributed random variables.
- @param scale :: β the scale factor or the mean of each of the distributed random variables.
- @return :: the sum of α independent exponentially distributed random variables, each of which has a mean of β.
RNG.weibull_variate(shape: float, scale: float) -> float
- Generalization of the exponential distribution.
- Similar to the gamma distribution but uses a closed form distribution function.
- Popular in reliability and survival analysis.
RNG.extreme_value_variate(location: float, scale: float) -> float
- Based on Extreme Value Theory.
- Used for statistical models of the magnitude of earthquakes and volcanoes.
RNG.chi_squared_variate(degrees_of_freedom: float) -> float
- Used with the Chi Squared Test and Null Hypotheses to test if sample data fits an expected distribution.
RNG.cauchy_variate(location: float, scale: float) -> float
- @param location :: It specifies the location of the peak. The default value is 0.0.
- @param scale :: It represents the half-width at half-maximum. The default value is 1.0.
- @return :: Continuous Distribution.
RNG.fisher_f_variate(degrees_of_freedom_1: float, degrees_of_freedom_2: float) -> float
- F distributions often arise when comparing ratios of variances.
RNG.student_t_variate(degrees_of_freedom: float) -> float
- T distribution. Same as a normal distribution except it uses the sample standard deviation rather than the population standard deviation.
- As degrees_of_freedom goes to infinity it converges with the normal distribution.
Development Log
RNG 1.6.4
- Installer update.
RNG 1.6.3
- More minor typos fixed.
RNG 1.6.2
- Minor typos fixed.
RNG 1.6.1
- Storm 3.2.2 Update.
RNG 1.6.0
- RNG is now compatible with python notebooks.
RNG 1.5.5
- Storm Update
RNG 1.5.4
- Storm 3.2 Update
RNG 1.5.3
- Fixed Typos
RNG 1.5.2
- Compiler Config Update
RNG 1.5.1
- A number of testing routines have been extracted into a new module: MonkeyScope.
- distribution
- timer
- distribution_timer
RNG 1.5.0, internal
- Further API Refinements, new naming convention for variate generators:
<algorithm name>_variate
RNG 1.4.2
- Install script update
- Test tweaks for noise reduction in timing tests.
RNG 1.4.1
- Test Patch for new API
- Documentation Updates
RNG 1.4.0
- API Refactoring
RNG 1.3.4
- Storm Update 3.1.1
RNG 1.3.3
- Installer script update
RNG 1.3.2
- Minor Bug Fix
RNG 1.3.1
- Test Update
RNG 1.3.1
- Fixed Typos
RNG 1.3.0
- Storm Update
RNG 1.2.5
- Low level clean up
RNG 1.2.4
- Minor Typos Fixed
RNG 1.2.3
- Documentation Update
- Test Update
- Bug Fixes
RNG 1.0.0 - 1.2.2, internal
- API Changes:
- randint changed to random_int
- randbelow changed to random_below
- random changed to generate_canonical
- uniform changed to random_float
RNG 0.2.3
- Bug Fixes
RNG 0.2.2
- discrete() removed.
RNG 0.2.1
- minor typos
- discrete() depreciated.
RNG 0.2.0
- Major Rebuild.
RNG 0.1.22
- The RNG Storm Engine is now the default standard.
- Experimental Vortex Engine added for testing.
RNG 0.1.21 beta
- Small update to the testing suite.
RNG 0.1.20 beta
- Changed default inputs for random_int and random_below to sane values.
- random_int(left_limit=1, right_limit=20) down from
-2**63, 2**63 - 1
- random_below(upper_bound=10) down from
2**63 - 1
- random_int(left_limit=1, right_limit=20) down from
RNG 0.1.19 beta
- Broke some fixed typos, for a change of pace.
RNG 0.1.18 beta
- Fixed some typos.
RNG 0.1.17 beta
- Major Refactoring.
- New primary engine: Hurricane.
- Experimental engine Typhoon added: random_below() only.
RNG 0.1.16 beta
- Internal Engine Performance Tuning.
RNG 0.1.15 beta
- Engine Testing.
RNG 0.1.14 beta
- Fixed a few typos.
RNG 0.1.13 beta
- Fixed a few typos.
RNG 0.1.12 beta
- Major Test Suite Upgrade.
- Major Bug Fixes.
- Removed several 'foot-guns' in prep for fuzz testing in future releases.
RNG 0.1.11 beta
- Fixed small bug in the install script.
RNG 0.1.10 beta
- Fixed some typos.
RNG 0.1.9 beta
- Fixed some typos.
RNG 0.1.8 beta
- Fixed some typos.
- More documentation added.
RNG 0.1.7 beta
- The
random_floating_point
function renamed torandom_float
. - The function
c_rand()
has been removed as well as all the cruft it required. - Major Documentation Upgrade.
- Fixed an issue where keyword arguments would fail to propagate. Both, positional args and kwargs now work as intended.
- Added this Dev Log.
RNG 0.0.6 alpha
- Minor ABI changes.
RNG 0.0.5 alpha
- Tests redesigned slightly for Float functions.
RNG 0.0.4 alpha
- Random Float Functions Implemented.
RNG 0.0.3 alpha
- Random Integer Functions Implemented.
RNG 0.0.2 alpha
- Random Bool Function Implemented.
RNG 0.0.1 pre-alpha
- Planning & Design.
MonkeyScope: Distribution and Performance Test Suite
MonkeyScope: RNG Tests
=========================================================================
Boolean Variate Distributions
Output Analysis: bernoulli_variate(0.0)
Typical Timing: 36 ± 5 ns
Statistics of 1000 samples:
Minimum: False
Median: False
Maximum: False
Mean: 0.0
Std Deviation: 0.0
Distribution of 10000 samples:
False: 100.0%
Output Analysis: bernoulli_variate(0.3333333333333333)
Typical Timing: 41 ± 7 ns
Statistics of 1000 samples:
Minimum: False
Median: False
Maximum: True
Mean: 0.314
Std Deviation: 0.46411636471902173
Distribution of 10000 samples:
False: 66.93%
True: 33.07%
Output Analysis: bernoulli_variate(0.5)
Typical Timing: 40 ± 5 ns
Statistics of 1000 samples:
Minimum: False
Median: False
Maximum: True
Mean: 0.494
Std Deviation: 0.4999639987039066
Distribution of 10000 samples:
False: 50.59%
True: 49.41%
Output Analysis: bernoulli_variate(0.6666666666666666)
Typical Timing: 40 ± 5 ns
Statistics of 1000 samples:
Minimum: False
Median: True
Maximum: True
Mean: 0.684
Std Deviation: 0.46491289506745237
Distribution of 10000 samples:
False: 33.22%
True: 66.78%
Output Analysis: bernoulli_variate(1.0)
Typical Timing: 32 ± 1 ns
Statistics of 1000 samples:
Minimum: True
Median: True
Maximum: True
Mean: 1.0
Std Deviation: 0.0
Distribution of 10000 samples:
True: 100.0%
Integer Variate Distributions
Base Case
Output Analysis: Random.randint(1, 6)
Typical Timing: 1088 ± 61 ns
Statistics of 1000 samples:
Minimum: 1
Median: 4
Maximum: 6
Mean: 3.532
Std Deviation: 1.6914419883637746
Distribution of 10000 samples:
1: 16.79%
2: 16.93%
3: 16.16%
4: 16.82%
5: 16.18%
6: 17.12%
Output Analysis: uniform_int_variate(1, 6)
Typical Timing: 59 ± 8 ns
Statistics of 1000 samples:
Minimum: 1
Median: 3
Maximum: 6
Mean: 3.426
Std Deviation: 1.7408400271133475
Distribution of 10000 samples:
1: 17.01%
2: 16.39%
3: 16.66%
4: 16.5%
5: 16.71%
6: 16.73%
Output Analysis: binomial_variate(4, 0.5)
Typical Timing: 140 ± 13 ns
Statistics of 1000 samples:
Minimum: 0
Median: 2
Maximum: 4
Mean: 2.038
Std Deviation: 0.984152427218467
Distribution of 10000 samples:
0: 6.12%
1: 25.1%
2: 37.29%
3: 25.0%
4: 6.49%
Output Analysis: negative_binomial_variate(5, 0.75)
Typical Timing: 118 ± 6 ns
Statistics of 1000 samples:
Minimum: 0
Median: 1
Maximum: 8
Mean: 1.685
Std Deviation: 1.4885479501850116
Distribution of 10000 samples:
0: 23.35%
1: 29.92%
2: 22.14%
3: 12.89%
4: 6.53%
5: 2.98%
6: 1.4%
7: 0.49%
8: 0.17%
9: 0.06%
10: 0.02%
11: 0.04%
13: 0.01%
Output Analysis: geometric_variate(0.75)
Typical Timing: 47 ± 4 ns
Statistics of 1000 samples:
Minimum: 0
Median: 0
Maximum: 5
Mean: 0.316
Std Deviation: 0.6404248589803491
Distribution of 10000 samples:
0: 75.33%
1: 18.4%
2: 4.72%
3: 1.12%
4: 0.34%
5: 0.07%
6: 0.01%
7: 0.01%
Output Analysis: poisson_variate(4.5)
Typical Timing: 110 ± 6 ns
Statistics of 1000 samples:
Minimum: 0
Median: 4
Maximum: 12
Mean: 4.454
Std Deviation: 2.1042537869753257
Distribution of 10000 samples:
0: 1.16%
1: 5.0%
2: 11.72%
3: 16.76%
4: 18.74%
5: 17.24%
6: 12.49%
7: 8.34%
8: 4.72%
9: 2.38%
10: 0.83%
11: 0.41%
12: 0.14%
13: 0.05%
14: 0.02%
Floating Point Variate Distributions
Base Case
Output Analysis: Random.random()
Typical Timing: 32 ± 1 ns
Statistics of 1000 samples:
Minimum: 0.00020470717953002815
Median: (0.4902766190643588, 0.49287975190577293)
Maximum: 0.9998379746872317
Mean: 0.4932275568514134
Std Deviation: 0.2943772077006881
Post-processor distribution of 10000 samples using round method:
0: 50.0%
1: 50.0%
Output Analysis: generate_canonical()
Typical Timing: 38 ± 4 ns
Statistics of 1000 samples:
Minimum: 0.0018313969488656262
Median: (0.4999019745098515, 0.5000103956471701)
Maximum: 0.9979157465022215
Mean: 0.4983743559000373
Std Deviation: 0.2857287394134513
Post-processor distribution of 10000 samples using round method:
0: 50.0%
1: 50.0%
Base Case
Output Analysis: Random.uniform(0.0, 10.0)
Typical Timing: 229 ± 16 ns
Statistics of 1000 samples:
Minimum: 0.0011475989233244999
Median: (4.686759881204559, 4.698175014514612)
Maximum: 9.994578954522886
Mean: 4.90558557056895
Std Deviation: 2.8901372998841577
Post-processor distribution of 10000 samples using floor method:
0: 9.58%
1: 10.5%
2: 10.06%
3: 10.09%
4: 10.19%
5: 9.98%
6: 10.21%
7: 9.76%
8: 10.05%
9: 9.58%
Output Analysis: uniform_real_variate(0.0, 10.0)
Typical Timing: 41 ± 7 ns
Statistics of 1000 samples:
Minimum: 0.003871772166954936
Median: (4.975709613518741, 4.99955707001919)
Maximum: 9.99847163973721
Mean: 5.041222981691081
Std Deviation: 2.8720806186652457
Post-processor distribution of 10000 samples using floor method:
0: 10.33%
1: 9.62%
2: 10.08%
3: 10.11%
4: 9.57%
5: 10.12%
6: 9.88%
7: 9.97%
8: 10.53%
9: 9.79%
Base Case
Output Analysis: Random.expovariate(1.0)
Typical Timing: 336 ± 21 ns
Statistics of 1000 samples:
Minimum: 0.0008104371505790905
Median: (0.6999357838616548, 0.7018251058756864)
Maximum: 7.266089757629259
Mean: 1.0321635246736387
Std Deviation: 1.084028320793121
Post-processor distribution of 10000 samples using floor method:
0: 63.7%
1: 22.72%
2: 8.33%
3: 3.3%
4: 1.26%
5: 0.4%
6: 0.22%
7: 0.04%
8: 0.01%
9: 0.01%
11: 0.01%
Output Analysis: exponential_variate(1.0)
Typical Timing: 58 ± 8 ns
Statistics of 1000 samples:
Minimum: 0.00018170037869458518
Median: (0.7377113850720796, 0.7382275278647656)
Maximum: 7.084870250885541
Mean: 1.0149957923408772
Std Deviation: 0.9661594059665878
Post-processor distribution of 10000 samples using floor method:
0: 63.61%
1: 23.32%
2: 8.32%
3: 3.09%
4: 1.22%
5: 0.26%
6: 0.07%
7: 0.09%
8: 0.01%
10: 0.01%
Base Case
Output Analysis: Random.gammavariate(1.0, 1.0)
Typical Timing: 487 ± 38 ns
Statistics of 1000 samples:
Minimum: 0.0010269090045949092
Median: (0.6758922146292059, 0.6764364701429871)
Maximum: 6.62473131254665
Mean: 0.9526441065384418
Std Deviation: 0.9235697791084873
Post-processor distribution of 10000 samples using floor method:
0: 62.38%
1: 23.78%
2: 8.78%
3: 3.13%
4: 1.15%
5: 0.51%
6: 0.15%
7: 0.08%
8: 0.03%
9: 0.01%
Output Analysis: gamma_variate(1.0, 1.0)
Typical Timing: 59 ± 6 ns
Statistics of 1000 samples:
Minimum: 7.943300227810338e-05
Median: (0.7410362381108585, 0.7486551841969276)
Maximum: 9.45441577468242
Mean: 1.0319939318688074
Std Deviation: 1.0133677265428946
Post-processor distribution of 10000 samples using floor method:
0: 63.46%
1: 23.11%
2: 8.67%
3: 3.01%
4: 1.18%
5: 0.37%
6: 0.08%
7: 0.07%
8: 0.03%
9: 0.02%
Base Case
Output Analysis: Random.weibullvariate(1.0, 1.0)
Typical Timing: 429 ± 28 ns
Statistics of 1000 samples:
Minimum: 0.00014457030695612128
Median: (0.6976139576861516, 0.6988385606862981)
Maximum: 7.441929633011179
Mean: 1.0360647371223919
Std Deviation: 1.0423724124307105
Post-processor distribution of 10000 samples using floor method:
0: 62.26%
1: 23.95%
2: 8.67%
3: 3.29%
4: 1.1%
5: 0.43%
6: 0.17%
7: 0.08%
8: 0.03%
9: 0.02%
Output Analysis: weibull_variate(1.0, 1.0)
Typical Timing: 97 ± 11 ns
Statistics of 1000 samples:
Minimum: 0.0001784696086844487
Median: (0.6941698928066924, 0.6948215528368951)
Maximum: 8.369567364716502
Mean: 0.9966718438000562
Std Deviation: 0.9674836941611771
Post-processor distribution of 10000 samples using floor method:
0: 63.68%
1: 23.0%
2: 8.41%
3: 3.08%
4: 1.33%
5: 0.28%
6: 0.16%
7: 0.03%
8: 0.03%
Output Analysis: extreme_value_variate(0.0, 1.0)
Typical Timing: 79 ± 9 ns
Statistics of 1000 samples:
Minimum: -2.0871331458605598
Median: (0.3869710970824426, 0.3904990435365016)
Maximum: 6.870642194863319
Mean: 0.5738754165001632
Std Deviation: 1.2729399422463183
Post-processor distribution of 10000 samples using round method:
-2: 1.2%
-1: 18.28%
0: 35.12%
1: 26.2%
2: 11.5%
3: 4.59%
4: 2.04%
5: 0.62%
6: 0.24%
7: 0.11%
8: 0.07%
9: 0.03%
Base Case
Output Analysis: Random.gauss(5.0, 2.0)
Typical Timing: 579 ± 4 ns
Statistics of 1000 samples:
Minimum: -1.0864435352344746
Median: (4.896021009703201, 4.8960635966136605)
Maximum: 11.016252215240552
Mean: 4.965365989325721
Std Deviation: 1.9758300884950102
Post-processor distribution of 10000 samples using round method:
-2: 0.04%
-1: 0.21%
0: 0.82%
1: 2.82%
2: 6.33%
3: 11.97%
4: 17.45%
5: 19.95%
6: 17.63%
7: 12.03%
8: 6.67%
9: 2.89%
10: 0.96%
11: 0.21%
12: 0.02%
Output Analysis: normal_variate(5.0, 2.0)
Typical Timing: 87 ± 2 ns
Statistics of 1000 samples:
Minimum: -2.405912295794069
Median: (5.0738045445174995, 5.082279716366891)
Maximum: 12.381509481018478
Mean: 5.092836336120188
Std Deviation: 2.014023813195181
Post-processor distribution of 10000 samples using round method:
-2: 0.06%
-1: 0.28%
0: 0.79%
1: 2.77%
2: 6.21%
3: 12.0%
4: 17.38%
5: 19.86%
6: 17.04%
7: 13.02%
8: 6.47%
9: 3.01%
10: 0.83%
11: 0.22%
12: 0.05%
13: 0.01%
Base Case
Output Analysis: Random.lognormvariate(1.6, 0.25)
Typical Timing: 871 ± 28 ns
Statistics of 1000 samples:
Minimum: 2.1400232821020095
Median: (4.970649274737473, 4.972897691731108)
Maximum: 11.584234487161941
Mean: 5.099080347282304
Std Deviation: 1.2828682146566066
Post-processor distribution of 10000 samples using round method:
2: 0.35%
3: 7.51%
4: 27.79%
5: 30.41%
6: 19.95%
7: 9.09%
8: 3.4%
9: 0.96%
10: 0.43%
11: 0.07%
12: 0.03%
14: 0.01%
Output Analysis: lognormal_variate(1.6, 0.25)
Typical Timing: 111 ± 10 ns
Statistics of 1000 samples:
Minimum: 2.0565509130084196
Median: (4.951319938162054, 4.956358747365627)
Maximum: 10.705411301927128
Mean: 5.084514398741803
Std Deviation: 1.2702879123571864
Post-processor distribution of 10000 samples using round method:
2: 0.23%
3: 7.93%
4: 26.34%
5: 31.23%
6: 20.45%
7: 9.02%
8: 3.25%
9: 1.12%
10: 0.33%
11: 0.08%
12: 0.02%
Output Analysis: chi_squared_variate(1.0)
Typical Timing: 123 ± 14 ns
Statistics of 1000 samples:
Minimum: 4.560050044340425e-07
Median: (0.43843953531720004, 0.44248536881992023)
Maximum: 12.827094790848676
Mean: 1.0076909905738598
Std Deviation: 1.4661644618564504
Post-processor distribution of 10000 samples using floor method:
0: 68.66%
1: 15.68%
2: 7.28%
3: 3.75%
4: 2.04%
5: 1.08%
6: 0.69%
7: 0.35%
8: 0.2%
9: 0.09%
10: 0.1%
11: 0.02%
12: 0.03%
13: 0.01%
15: 0.02%
Output Analysis: cauchy_variate(0.0, 1.0)
Typical Timing: 81 ± 7 ns
Statistics of 1000 samples:
Minimum: -80.60257833512122
Median: (-0.07136445696912773, -0.06912576811779096)
Maximum: 302.9285259983777
Mean: 0.048158350818380484
Std Deviation: 14.33030682036316
Post-processor distribution of 10000 samples using floor_mod_10 method:
0: 25.9%
1: 11.52%
2: 5.6%
3: 3.76%
4: 3.18%
5: 3.41%
6: 3.9%
7: 5.8%
8: 10.97%
9: 25.96%
Output Analysis: fisher_f_variate(8.0, 8.0)
Typical Timing: 201 ± 18 ns
Statistics of 1000 samples:
Minimum: 0.06789103397534023
Median: (0.9903987592191404, 0.990587816520427)
Maximum: 11.194291185158521
Mean: 1.2913804655586418
Std Deviation: 1.0772469766917976
Post-processor distribution of 10000 samples using floor method:
0: 50.15%
1: 32.35%
2: 10.29%
3: 3.99%
4: 1.61%
5: 0.67%
6: 0.31%
7: 0.19%
8: 0.1%
9: 0.14%
10: 0.05%
11: 0.05%
12: 0.02%
13: 0.03%
14: 0.01%
15: 0.01%
16: 0.01%
18: 0.01%
106: 0.01%
Output Analysis: student_t_variate(8.0)
Typical Timing: 164 ± 12 ns
Statistics of 1000 samples:
Minimum: -5.182813039237713
Median: (-0.040463896877030454, -0.03931607130970538)
Maximum: 5.338481501612407
Mean: 0.005453093050598653
Std Deviation: 1.1905125047921103
Post-processor distribution of 10000 samples using round method:
-7: 0.01%
-6: 0.03%
-5: 0.05%
-4: 0.36%
-3: 1.4%
-2: 6.6%
-1: 23.55%
0: 36.53%
1: 23.14%
2: 6.39%
3: 1.42%
4: 0.34%
5: 0.14%
6: 0.02%
7: 0.02%
=========================================================================
Total Test Time: 0.5327 seconds
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