0
 from numpy import *; from scipy.optimize import *; from math import *
def f(X):
    x=X[0];    y=X[1]
    return x**4-3.5*x**3-2*x**2+12*x+y**2-2*y

bnds = ((1,5), (0, 2))
min_test = minimize(f,[1,0.1], bounds = bnds); 
print(min_test.x)

My function f(X)has a local minima at x=2.557, y=1 which I should be able to find.

The code showed above will only give result where x=1. I have tried with different tolerance and alle three method: L-BFGS-B, TNC and SLSQP. This is the thread I have been looking at so far: Scipy.optimize: how to restrict argument values

How can I fix this?

I am using Spyder(Python 3.6).

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  • print(f([2557, 1])) = 42690172880760.5, I would not call this a local minimum... – Joe Sep 21 '18 at 7:10
  • f([1, 1]) = 6.5 – Joe Sep 21 '18 at 7:11
  • Sorry, I meant 2.557. I have edited – Kim Sep 21 '18 at 7:20
4

You just encounterd the problem with local optimization: it strongly depends on the start (initial) values you pass in. If you supply [2, 1] it will find the correct minima.

Common solutions are:

  • use your optimization in a loop with random starting points inside your boundaries

    import numpy as np
    from numpy import *; from scipy.optimize import *; from math import *
    
    def f(X):
        x=X[0];    y=X[1]
        return x**4-3.5*x**3-2*x**2+12*x+y**2-2*y
    
    bnds = ((1,3), (0, 2))
    
    for i in range(100):
    
        x_init = np.random.uniform(low=bnds[0][0], high=bnds[0][1])
        y_init = np.random.uniform(low=bnds[1][0], high=bnds[1][1])
    
        min_test = minimize(f,[x_init, y_init], bounds = bnds)
    
        print(min_test.x, min_test.fun)
    
  • use an algorithm that can break free of local minima, I can recommend scipy's basinhopping()

  • use a global optimization algorithm and use it's result as initial value for a local algorithm. Recommendations are NLopt's DIRECT or the MADS algorithms (e.g. NOMAD). There is also another one in scipy, shgo, that I have no tried yet.

  • Thank you. I have actually much problems with scipy.minimize when functions gets long and complicated. Can you recommend alternatives? – Kim Sep 21 '18 at 8:09
  • What do you mean with long and complicated? There are some other optimization modules, e.g. nlopt. But they all will use your long and complicated function. In the end the methods available in scipy are fine for a large variety of problems. – Joe Sep 21 '18 at 8:24
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Try scipy.optimize.basinhopping. It simply just repeat your minimize procedure multiple times and get multiple local minimums. The minimal one is the global minimum.

minimizer_kwargs = {"method": "L-BFGS-B"}
res=optimize.basinhopping(nethedge,guess,niter=100,minimizer_kwargs=minimizer_kwargs)

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