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) print('Nelder-Mead:\t', res.x, function(res.x, bs, cs)) 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.
Thank you for your help!