2

I'm trying to minimize function, that returns a vector of values, and here is an error:

setting an array element with a sequence

Code:

P = np.matrix([[0.3, 0.1, 0.2], [0.01, 0.4, 0.2], [0.0001, 0.3, 0.5]])  
Ps = np.array([10,14,5])

def objective(x):   
    x = np.array([x])
    res = np.square(Ps - np.dot(x, P)) 
    return res 

def main():
    x = np.array([10, 11, 15])
    print minimize(objective, x, method='Nelder-Mead')

At these values of P, Ps, x function returns [[ 47.45143225 16.81 44.89 ]]

Thank you for any advice

UPD (full traceback)

    Traceback (most recent call last):

  File "<ipython-input-125-9649a65940b0>", line 1, in <module>
    runfile('C:/Users/Roark/Documents/Python Scripts/optimize.py', wdir='C:/Users/Roark/Documents/Python Scripts')

  File "C:\Anaconda\lib\site-packages\spyderlib\widgets\externalshell\sitecustomize.py", line 585, in runfile
    execfile(filename, namespace)

  File "C:/Users/Roark/Documents/Python Scripts/optimize.py", line 28, in <module>
    main()

  File "C:/Users/Roark/Documents/Python Scripts/optimize.py", line 24, in main
    print minimize(objective, x, method='Nelder-Mead')

  File "C:\Anaconda\lib\site-packages\scipy\optimize\_minimize.py", line 413, in minimize
    return _minimize_neldermead(fun, x0, args, callback, **options)

  File "C:\Anaconda\lib\site-packages\scipy\optimize\optimize.py", line 438, in _minimize_neldermead
    fsim[0] = func(x0)

ValueError: setting an array element with a sequence.

UPD2: function should be minimized (Ps is a vector)

enter image description here

2
  • Please post the full Traceback.
    – miindlek
    Aug 8 '14 at 10:36
  • @miindlek just updated my post
    – Rachnog
    Aug 8 '14 at 10:39
3

If you want you resulting vector to be a vector containing only 0s, you can use fsolve to do so. To do that will require modifying your objective function a little bit to get the input and output into the same shape:

import scipy.optimize as so
P = np.matrix([[0.3, 0.1, 0.2], [0.01, 0.4, 0.2], [0.0001, 0.3, 0.5]])  
Ps = np.array([10,14,5])

def objective(x):   
    x = np.array([x])
    res = np.square(Ps - np.dot(x, P)) 
    return np.array(res).ravel() 
Root = so.fsolve(objective, x0=np.array([10, 11, 15]))
objective(Root)
#[  5.04870979e-29   1.13595970e-28   1.26217745e-29]

Result: The solution is np.array([ 31.95419775, 41.56815698, -19.40894189])

1
  • +1 fsolve should have occurred to me! It's worth pointing, though, out that fsolve uses MINPACK hybrd.f which minimizes the euclidean norm of the vector, so the actual 'objective function' used internally would be equivalent to the square root of mine. Loss functions still need to have a scalar output.
    – ali_m
    Aug 8 '14 at 20:57
2

Your objective function needs to return a scalar value, not a vector. You probably want to return the sum of squared errors rather than the vector of squared errors:

def objective(x):
    res = ((Ps - np.dot(x, P)) ** 2).sum()
    return res 
4
  • I updated my post, there is a function to be minimized. It returns a vector, not a scalar value. Ps - is a vector.
    – Rachnog
    Aug 8 '14 at 11:01
  • 2
    @Rachnog Well... that's a problem. Your loss function always has to return a scalar value that reflects the overall 'goodness' of the current parameter set. Suppose, for the moment, that the objective function returns a vector. I find that increasing x[0] reduces objective(x)[0] but increases objective(x)[1]. How should I update x?
    – ali_m
    Aug 8 '14 at 11:13
  • I should think about it, maybe it's error in related article or I don't inderstand sense of Ps :)
    – Rachnog
    Aug 8 '14 at 11:47
  • Generally it is a poor advice to convert least squares problem to minimization of a scalar function, because this way the information about structure of x is lost and it may take much more iterations to converge, or it can fail to converge altogether
    – fdermishin
    Feb 9 '21 at 13:50
0

Use least_squares. This will require to modify the objective a bit to return differences instead of squared differences:

import numpy as np
from scipy.optimize import least_squares

P = np.matrix([[0.3, 0.1, 0.2], [0.01, 0.4, 0.2], [0.0001, 0.3, 0.5]])  
Ps = np.array([10,14,5])

def objective(x):
    x = np.array([x])
    res = Ps - np.dot(x, P)
    return np.asarray(res).flatten()

def main():
    x = np.array([10, 11, 15])
    print(least_squares(objective, x))

Result:

 active_mask: array([0., 0., 0.])
        cost: 5.458917464129402e-28
         fun: array([1.59872116e-14, 2.84217094e-14, 5.32907052e-15])
        grad: array([-8.70414856e-15, -1.25943700e-14, -1.11926469e-14])
         jac: array([[-3.00000002e-01, -1.00000007e-02, -1.00003682e-04],
       [-1.00000001e-01, -3.99999999e-01, -3.00000001e-01],
       [-1.99999998e-01, -1.99999999e-01, -5.00000000e-01]])
     message: '`gtol` termination condition is satisfied.'
        nfev: 4
        njev: 4
  optimality: 1.2594369966691647e-14
      status: 1
     success: True
           x: array([ 31.95419775,  41.56815698, -19.40894189])

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