flopscope.

flopscope.numpy.random.Generator.standard_gamma

fnp.random.Generator.standard_gamma(self, shape, size=None, dtype=<class 'numpy.float64'>, out=None)

Draw samples from a standard Gamma distribution.

Adapted from NumPy docs np.random.Generator.standard_gamma

Arearandom
Typecounted
NumPy Refnp.random.Generator.standard_gamma
Cost
numel(output)\text{numel}(\text{output})
Flopscope Context

Standard gamma; cost = numel(output).

Samples are drawn from a Gamma distribution with specified parameters, shape (sometimes designated "k") and scale=1.

Parameters

shape:float or array_like of floats

Parameter, must be non-negative.

size:int or tuple of ints, optional

Output shape. If the given shape is, e.g., (m, n, k), then m * n * k samples are drawn. If size is None (default), a single value is returned if shape is a scalar. Otherwise, flops.array(shape).size samples are drawn.

dtype:dtype, optional

Desired dtype of the result, only float64 and float32 are supported. Byteorder must be native. The default value is flops.float64.

out:ndarray, optional

Alternative output array in which to place the result. If size is not None, it must have the same shape as the provided size and must match the type of the output values.

Returns

out:ndarray or scalar

Drawn samples from the parameterized standard gamma distribution.

See also

  • scipy.stats.gamma probability density function, distribution or cumulative density function, etc.

Notes

The probability density for the Gamma distribution is

p(x)=xk1ex/θθkΓ(k),p(x) = x^{k-1}\frac{e^{-x/\theta}}{\theta^k\Gamma(k)},

where kk is the shape and θ\theta the scale, and Γ\Gamma is the Gamma function.

The Gamma distribution is often used to model the times to failure of electronic components, and arises naturally in processes for which the waiting times between Poisson distributed events are relevant.

References

footnote
1

Weisstein, Eric W. "Gamma Distribution." From MathWorld--A
Wolfram Web Resource.
https://mathworld.wolfram.com/GammaDistribution.html
footnote
2

Wikipedia, "Gamma distribution",
https://en.wikipedia.org/wiki/Gamma_distribution

Examples

Draw samples from the distribution:

>>> shape, scale = 2., 1. # mean and width
>>> rng = flops.random.default_rng()
>>> s = rng.standard_gamma(shape, 1000000)

Display the histogram of the samples, along with the probability density function:

>>> import matplotlib.pyplot as plt
>>> import scipy.special as sps  # doctest: +SKIP
>>> count, bins, _ = plt.hist(s, 50, density=True)
>>> y = bins**(shape-1) * ((flops.exp(-bins/scale))/  # doctest: +SKIP
... (sps.gamma(shape) * scale**shape))
>>> plt.plot(bins, y, linewidth=2, color='r')  # doctest: +SKIP
>>> plt.show()