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Lets say I have a Matrix N with size n_i x n_o and I want to normalize it row-wise,i.e., the sum of each row should be one. How can I do this in theano?

Motivation: using softmax returns back error for me, so I try to kind of sidestep it by implementing my own version of softmax.

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    Shouldn't you rather look into fixing the error with the softmax then? :) – eickenberg Feb 15 '15 at 14:49
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See if the following is useful for you:

import theano
import theano.tensor as T

m = T.matrix(dtype=theano.config.floatX)
m_normalized = m / m.sum(axis=1).reshape((m.shape[0], 1))

f = theano.function([m], m_normalized)

import numpy as np
a = np.exp(np.random.randn(5, 10)).astype(theano.config.floatX)

b = f(a)
c = a / a.sum(axis=1)[:, np.newaxis]

from numpy.testing import assert_array_equal
assert_array_equal(b, c)
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    Instead of the reshape after the sum, I think keepdims=True would be cleaner in sum. – Albert Feb 11 '16 at 10:09
  • Indeed. I had seen that argument, but have never used it, because I don't think it exists in numpy. But you are right, it is definitely more concise. – eickenberg Feb 11 '16 at 12:51
  • If would be nice if you addressed the divide by zero possibilities; one of the rows can sum to zero. – hlin117 Mar 16 '16 at 20:06
  • Yes, this can be added. The question is how you want to take care of it. You could systematically add a very small number in the denominator, but it has to be orders of magnitude smaller than your smallest nonzero number. Or you actually implement a decision mechanism by using T.setsubtensor on a mask or a switch operation. – eickenberg Mar 17 '16 at 12:05
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    Here assert_array_equal raises assertion error because the answers will not be exact due to floating point arithmetic. It could be misleading even though the code is correct. – scv May 28 '17 at 22:49
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or you can also use

m/m.norm(1, axis=1).reshape((m.shape[0], 1))
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  • That is equivalent iff the sum is positive (which I hope it would be chosen to be). If it is not, then my answer will probably lead to unexpected behavior whereas dividing by the norm will do a simple scaling and not change the sign. – eickenberg Nov 20 '17 at 16:35

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