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experts. I'm trying to maximize a function my_obj with the Nelder-Mead algorithm to fit my data. For this i have taken help from the scipy's optimize.fmin . I think i am very close to the solutions but missing something and getting an error like:

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As explained in the scipy.optimize.minimize documentation, you should be using a 1-D array (or a 1-D list because it is compatible) as input for your objective function instead of multiple parameters:

#!/usr/bin/env python
import numpy as np
from scipy.optimize import minimize


d1 = np.array([ 5.0, 10.0, 15.0, 20.0, 25.0])
h = np.array([10000720600.0, 10011506200.0, 10057741200.0, 10178305100.0,10415318500.0])

b = 2.0
cx = 2.0
#objective function

def  obj_function(x): # EDIT: Input is a list
     m,n,r= x
     pw = 1/cx
     c = b*cx
     x1 = 1+(d1/n)**c
     x2 = 1+(d1/m)**c
     x3 = (x1/x2)**pw
     dcal = (r)*x3
     dobs = (h)
     deld=((np.log10(dcal)-np.log10(dobs)))**2
     return np.sum(deld)

print(obj_function([5.0,10.0,15.0])) # EDIT: Input is a list
x0 = [5.0,10.0,15.0]
print(obj_function(x0))
res = minimize(obj_function, x0, method='nelder-mead')
print(res)

Output:

% python3 script.py
432.6485766651165
432.6485766651165
 final_simplex: (array([[7.76285924e+00, 3.02470699e-04, 1.93396980e+01],
       [7.76286507e+00, 3.02555020e-04, 1.93397231e+01],
       [7.76285178e+00, 3.01100639e-04, 1.93397381e+01],
       [7.76286445e+00, 3.01025402e-04, 1.93397169e+01]]), array([0.12196442, 0.12196914, 0.12197448, 0.12198028]))
           fun: 0.12196441986340725
       message: 'Optimization terminated successfully.'
          nfev: 130
           nit: 67
        status: 0
       success: True
             x: array([7.76285924e+00, 3.02470699e-04, 1.93396980e+01])
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  • You are welcome. Note that you can improve the performance of your code by computing pw, c and dobs once outside of the objective function because it is evaluated at each iteration of the Nelder-Mead algorithm.
    – bousof
    Jul 4, 2020 at 13:31
  • Yes it should be the same resulkts but the computation time is smaller.
    – bousof
    Jul 4, 2020 at 17:44

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