# fminunc alternate in numpy

Is their an alternate of fminunc function(in octave) in python. I have a cost function for a binary classifier. Now I want to run gradient descent to get minimum value of theta. The octave implementation will look like this.

``````%  Set options for fminunc
options = optimset('GradObj', 'on', 'MaxIter', 400);

%  Run fminunc to obtain the optimal theta
%  This function will return theta and the cost
[theta, cost] = ...
fminunc(@(t)(costFunction(t, X, y)), initial_theta, options);
``````

I have converted my costFunction in python using numpy library, and looking for the fminunc or any other gradient descent algorithm implementation in numpy.

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There is more information about the functions of interest here: http://docs.scipy.org/doc/scipy-0.10.0/reference/tutorial/optimize.html

Also, it looks like you are doing the Coursera Machine Learning course, but in Python. You might check out http://aimotion.blogspot.com/2011/11/machine-learning-with-python-logistic.html; this guy's doing the same thing.

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Looks like you have to change to `scipy`.

There you find all basic optimization algorithms readily implemented.

http://docs.scipy.org/doc/scipy/reference/optimize.html

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More specifically, from this forum post it seems that octave's `fminunc` uses some form of BFGS (couldn't find a more authoritative reference). So `scipy.optimize.fmin_bfgs` seems like the closest parallel to `fminunc`. –  alecbenzer Dec 23 '13 at 22:58

I was also trying to implement logistic regression as discussed in Coursera ML course, but in python. I found scipy helpful. After trying different algorithm implementations in minimize function, I found Newton Conjugate Gradient as most helpful. Also After examining its returned value, it seems that it is equivalent to that of fminunc in Octave. I have included my implementation in python below find to optimal theta.

``````import numpy as np
import scipy.optimize as op

def Sigmoid(z):
return 1/(1 + np.exp(-z));

m , n = x.shape
theta = theta.reshape((n,1));
y = y.reshape((m,1))
sigmoid_x_theta = Sigmoid(x.dot(theta));

def CostFunc(theta,x,y):
m,n = x.shape;
theta = theta.reshape((n,1));
y = y.reshape((m,1));
term1 = np.log(Sigmoid(x.dot(theta)));
term2 = np.log(1-Sigmoid(x.dot(theta)));
term1 = term1.reshape((m,1))
term2 = term2.reshape((m,1))
term = y * term1 + (1 - y) * term2;
J = -((np.sum(term))/m);
return J;

# intialize X and y
X = np.array([[1,2,3],[1,3,4]]);
y = np.array([[1],[0]]);

m , n = X.shape;
initial_theta = np.zeros(len(n));
Result = op.minimize(fun = CostFunc,
x0 = initial_theta),
args = (X, y),
method = 'TNC',