# Problems and questions regarding scipy.optimize.minimize in Python

I have some questions and problems regarding scipy's optimize.minimize routine. I would like to minimize the function:

f(eta) = sum_i |eta*x_i - y_i|

with regard to eta. Since I am not familiar with the minimize routine and the corresponding methods, I tried some out. However, using method BFGS raises the following error:

``````File "/usr/local/lib/python3.4/dist-packages/scipy/optimize/_minimize.py", line 441, in minimize return _minimize_bfgs(fun, x0, args, jac, callback, **options)
File "/usr/local/lib/python3.4/dist-packages/scipy/optimize/optimize.py", line 904, in _minimize_bfgs
A1 = I - sk[:, numpy.newaxis] * yk[numpy.newaxis, :] * rhok
IndexError: 0-d arrays can only use a single () or a list of newaxes (and a single ...) as an index
``````

which I was not able to solve. Please find code, which causes the error below. I am using Python3 with scipy 0.17.0 and numpy 1.8.2 on Ubuntu 14.04.3 LTS.

Furthermore, the method conjugate gradient seems to perform worse than other methods.

Last but not least, I favour estimating the minimum by finding the zero of the first derivative via scipy.optimize.brentq. Is this fine or do you recommend another approach? I prefer robustness over speed.

Here is some code illustrating the problems and questions:

``````from scipy import optimize
import numpy as np

def function(x, bs, cs):
sum = 0.
for b, c in zip(bs, cs):
sum += np.abs(x*b - c)
return sum

def derivativeFunction(x, bs, cs):
sum = 0.
for b, c in zip(bs, cs):
if x*b > c:
sum += b
else:
sum -= b
return sum

np.random.seed(1000)
bs = np.random.rand(10)
cs = np.random.rand(10)

eta0 = 0.5

res = optimize.minimize(fun=function, x0=eta0, args=(bs, cs), method='Nelder-Mead', tol=1e-6)

res = optimize.minimize(fun=function, x0=eta0, args=(bs, cs,),  method='CG', jac=derivativeFunction, tol=1e-6)
print('CG:\t', res.x, function(res.x, bs, cs))

x = optimize.brentq(f=derivativeFunction, a=0, b=2., args=(bs, cs), xtol=1e-6, maxiter=100)
print('Brentq:\t', x, function(x, bs, cs))

#Throwing the error
res = optimize.minimize(fun=function, x0=eta0, args=(bs, cs), method='BFGS', jac=derivativeFunction, tol=1e-6)
print('BFGS:\t', res.x, function(res.x, bs, cs))
``````

Its output is:

``````Nelder-Mead:     0.493537902832 3.71986334101
CG:  0.460178525461 3.72659733011
Brentq:  0.49353725172947666 3.71986347245
``````

where the first value is the position of the minimum and the second value the minimum itself. The output misses the error message from above.