xorbits.numpy.random.logseries#

xorbits.numpy.random.logseries(p, size=None)[源代码]#

Draw samples from a logarithmic series distribution.

Samples are drawn from a log series distribution with specified shape parameter, 0 <= p < 1.

备注

New code should use the ~numpy.random.Generator.logseries method of a ~numpy.random.Generator instance instead; please see the random-quick-start.

参数

  • p (float or array_like of floats) – Shape parameter for the distribution. Must be in the range [0, 1).

  • 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 p is a scalar. Otherwise, np.array(p).size samples are drawn.

返回

out – Drawn samples from the parameterized logarithmic series distribution.

返回类型

ndarray or scalar

参见

scipy.stats.logser

probability density function, distribution or cumulative density function, etc.

random.Generator.logseries

which should be used for new code.

提示

The probability density for the Log Series distribution is

\[P(k) = \frac{-p^k}{k \ln(1-p)},\]

where p = probability.

The log series distribution is frequently used to represent species richness and occurrence, first proposed by Fisher, Corbet, and Williams in 1943 [2]. It may also be used to model the numbers of occupants seen in cars [3].

引用

1

Buzas, Martin A.; Culver, Stephen J., Understanding regional species diversity through the log series distribution of occurrences: BIODIVERSITY RESEARCH Diversity & Distributions, Volume 5, Number 5, September 1999 , pp. 187-195(9).

2

Fisher, R.A,, A.S. Corbet, and C.B. Williams. 1943. The relation between the number of species and the number of individuals in a random sample of an animal population. Journal of Animal Ecology, 12:42-58.

3

D. J. Hand, F. Daly, D. Lunn, E. Ostrowski, A Handbook of Small Data Sets, CRC Press, 1994.

4

Wikipedia, “Logarithmic distribution”, https://en.wikipedia.org/wiki/Logarithmic_distribution

实际案例

Draw samples from the distribution:

>>> a = .6  
>>> s = np.random.logseries(a, 10000)  
>>> import matplotlib.pyplot as plt  
>>> count, bins, ignored = plt.hist(s)

# plot against distribution

>>> def logseries(k, p):  
...     return -p**k/(k*np.log(1-p))
>>> plt.plot(bins, logseries(bins, a)*count.max()/  
...          logseries(bins, a).max(), 'r')
>>> plt.show()

This docstring was copied from numpy.random.