Python – 统计中的对数伽马分布

# importing library
  
from scipy.stats import loggamma  
    
numargs = loggamma.numargs 
a, b = 4.32, 3.18
rv = loggamma(a, b) 
    
print ("RV : \n", rv)  

RV : 
 scipy.stats._distn_infrastructure.rv_frozen object at 0x000002A9D6AE0588

import numpy as np 
quantile = np.arange (0.01, 1, 0.1) 
  
# Random Variates 
R = loggamma.rvs(a, b) 
print ("Random Variates : \n", R) 
  
# PDF 
R = loggamma.pdf(a, b, quantile) 
print ("\nProbability Distribution : \n", R) 

Random Variates : 
 3.941580350134656

Probability Distribution : 
 [1.76757240e-27 1.53388070e-24 6.78322725e-22 1.62994246e-19
 2.25532281e-17 1.89389591e-15 1.01217167e-13 3.59400367e-12
 8.81510518e-11 1.54700389e-09]

import numpy as np 
import matplotlib.pyplot as plt 
     
distribution = np.linspace(0, np.minimum(rv.dist.b, 3)) 
print("Distribution : \n", distribution) 
     
plot = plt.plot(distribution, rv.pdf(distribution)) 

Distribution : 
 [0.         0.06122449 0.12244898 0.18367347 0.24489796 0.30612245
 0.36734694 0.42857143 0.48979592 0.55102041 0.6122449  0.67346939
 0.73469388 0.79591837 0.85714286 0.91836735 0.97959184 1.04081633
 1.10204082 1.16326531 1.2244898  1.28571429 1.34693878 1.40816327
 1.46938776 1.53061224 1.59183673 1.65306122 1.71428571 1.7755102
 1.83673469 1.89795918 1.95918367 2.02040816 2.08163265 2.14285714
 2.20408163 2.26530612 2.32653061 2.3877551  2.44897959 2.51020408
 2.57142857 2.63265306 2.69387755 2.75510204 2.81632653 2.87755102
 2.93877551 3.        ]
 

import matplotlib.pyplot as plt 
import numpy as np 
     
x = np.linspace(0, 5, 100) 
     
# Varying positional arguments 
y1 = loggamma .pdf(x, 1, 3) 
y2 = loggamma .pdf(x, 1, 4) 
plt.plot(x, y1, "*", x, y2, "r--")