# Cost function in logistic regression gives NaN as a result

I am implementing logistic regression using batch gradient descent. There are two classes into which the input samples are to be classified. The classes are 1 and 0. While training the data, I am using the following sigmoid function:

``````t = 1 ./ (1 + exp(-z));
``````

where

``````z = x*theta
``````

And I am using the following cost function to calculate cost, to determine when to stop training.

``````function cost = computeCost(x, y, theta)
htheta = sigmoid(x*theta);
cost = sum(-y .* log(htheta) - (1-y) .* log(1-htheta));
end
``````

I am getting the cost at each step to be NaN as the values of `htheta` are either 1 or zero in most cases. What should I do to determine the cost value at each iteration?

This is the gradient descent code for logistic regression:

``````function [theta,cost_history] = batchGD(x,y,theta,alpha)

cost_history = zeros(1000,1);

for iter=1:1000
htheta = sigmoid(x*theta);
new_theta = zeros(size(theta,1),1);
for feature=1:size(theta,1)
new_theta(feature) = theta(feature) - alpha * sum((htheta - y) .*x(:,feature))
end
theta = new_theta;
cost_history(iter) = computeCost(x,y,theta);
end
end
``````
• What language are you using for coding that? Could you provide a minimal reproducible example along with data? – Arton Dorneles Feb 15 '16 at 22:06
• I am using Matlab. – Neel Shah Feb 15 '16 at 22:06
• The data consists of 57 features and has a label either 1 or 0, which is the y vector – Neel Shah Feb 15 '16 at 22:07
• Any more details which I can provide you? – Neel Shah Feb 15 '16 at 22:46
• It would be nice if you could provide a link with your data file. Do you verify the NaN values through the `cost_history` variable? Note that this variable has size 1000, but you is running 5000000 iterations. So `cost_history(iter) = computeCost(x,y,theta);` may be defining values that are out of range. – Arton Dorneles Feb 15 '16 at 23:33

There are two possible reasons why this may be happening to you.

# The data is not normalized

This is because when you apply the sigmoid / logit function to your hypothesis, the output probabilities are almost all approximately 0s or all 1s and with your cost function, `log(1 - 1)` or `log(0)` will produce `-Inf`. The accumulation of all of these individual terms in your cost function will eventually lead to `NaN`.

Specifically, if `y = 0` for a training example and if the output of your hypothesis is `log(x)` where `x` is a very small number which is close to 0, examining the first part of the cost function would give us `0*log(x)` and will in fact produce `NaN`. Similarly, if `y = 1` for a training example and if the output of your hypothesis is also `log(x)` where `x` is a very small number, this again would give us `0*log(x)` and will produce `NaN`. Simply put, the output of your hypothesis is either very close to 0 or very close to 1.

This is most likely due to the fact that the dynamic range of each feature is widely different and so a part of your hypothesis, specifically the weighted sum of `x*theta` for each training example you have will give you either very large negative or positive values, and if you apply the sigmoid function to these values, you'll get very close to 0 or 1.

One way to combat this is to normalize the data in your matrix before performing training using gradient descent. A typical approach is to normalize with zero-mean and unit variance. Given an input feature `x_k` where `k = 1, 2, ... n` where you have `n` features, the new normalized feature `x_k^{new}` can be found by:

`m_k` is the mean of the feature `k` and `s_k` is the standard deviation of the feature `k`. This is also known as standardizing data. You can read up on more details about this on another answer I gave here: How does this code for standardizing data work?

Because you are using the linear algebra approach to gradient descent, I'm assuming you have prepended your data matrix with a column of all ones. Knowing this, we can normalize your data like so:

``````mX = mean(x,1);
mX(1) = 0;
sX = std(x,[],1);
sX(1) = 1;
xnew = bsxfun(@rdivide, bsxfun(@minus, x, mX), sX);
``````

The mean and standard deviations of each feature are stored in `mX` and `sX` respectively. You can learn how this code works by reading the post I linked to you above. I won't repeat that stuff here because that isn't the scope of this post. To ensure proper normalization, I've made the mean and standard deviation of the first column to be 0 and 1 respectively. `xnew` contains the new normalized data matrix. Use `xnew` with your gradient descent algorithm instead. Now once you find the parameters, to perform any predictions you must normalize any new test instances with the mean and standard deviation from the training set. Because the parameters learned are with respect to the statistics of the training set, you must also apply the same transformations to any test data you want to submit to the prediction model.

Assuming you have new data points stored in a matrix called `xx`, you would do normalize then perform the predictions:

``````xxnew = bsxfun(@rdivide, bsxfun(@minus, xx, mX), sX);
``````

Now that you have this, you can perform your predictions:

``````pred = sigmoid(xxnew*theta) >= 0.5;
``````

You can change the threshold of 0.5 to be whatever you believe is best that determines whether examples belong in the positive or negative class.

# The learning rate is too large

As you mentioned in the comments, once you normalize the data the costs appear to be finite but then suddenly go to NaN after a few iterations. Normalization can only get you so far. If your learning rate or `alpha` is too large, each iteration will overshoot in the direction towards the minimum and would thus make the cost at each iteration oscillate or even diverge which is what is appearing to be happening. In your case, the cost is diverging or increasing at each iteration to the point where it is so large that it can't be represented using floating point precision.

As such, one other option is to decrease your learning rate `alpha` until you see that the cost function is decreasing at each iteration. A popular method to determine what the best learning rate would be is to perform gradient descent on a range of logarithmically spaced values of `alpha` and seeing what the final cost function value is and choosing the learning rate that resulted in the smallest cost.

Using the two facts above together should allow gradient descent to converge quite nicely, assuming that the cost function is convex. In this case for logistic regression, it most certainly is.

• Yes I figured that out. Thank you soo much. – Neel Shah Feb 16 '16 at 5:02
• I am getting few values properly, but most of the values are still NaN. Any way to overcome this too? – Neel Shah Feb 16 '16 at 5:56
• Yes if that is happening, one way is to enforce a cap on large negative and positive values. In your cost function file before you compute the sum, you can do something like `htheta(htheta >= 100) = 100; htheta(htheta <= -100) = -100;` This will ensure that when you apply the `log` to your hypothesis vector, you will get floating-point friendly results. If you get a hypothesis that is larger than 100 or smaller than -100, then we can safely assume that we can classify the input into the 1 or 0 class respectively and so placing this cap on your results should be OK. – rayryeng - Reinstate Monica Feb 16 '16 at 6:04
• I am still not able to get proper accuracy. This is the dataset which I am working on: archive.ics.uci.edu/ml/datasets/Spambase – Neel Shah Feb 16 '16 at 6:39
• @MatthewGunn Figured out why the `NaN`s were happening. `y` can be 0 or 1 with this problem, and doing `y*log(x*theta)` where `x*theta` can be close to 0 would thus make `0*log(0)` and thus produce `NaN`. – rayryeng - Reinstate Monica Feb 16 '16 at 17:11

Let's assume you have an observation where:

• the true value is y_i = 1
• your model is quite extreme and says that P(y_i = 1) = 1

Then your cost function will get a value of `NaN` because you're adding `0 * log(0)`, which is undefined. Hence:

### Your formula for the cost function has a problem (there is a subtle 0, infinity issue)!

As @rayryeng pointed out, `0 * log(0)` produces a `NaN` because `0 * Inf` isn't kosher. This is actually a huge problem: if your algorithm believes it can predict a value perfectly, it incorrectly assigns a cost of `NaN`.

``````cost = sum(-y .* log(htheta) - (1-y) .* log(1-htheta));
``````

You can avoid multiplying 0 by infinity by instead writing your cost function in Matlab as:

``````y_logical = y == 1;
cost = sum(-log(htheta(y_logical))) + sum( - log(1 - htheta(~y_logical)));
``````

The idea is if `y_i` is 1, we add `-log(htheta_i)` to the cost, but if `y_i` is 0, we add `-log(1 - htheta_i)` to the cost. This is mathematically equivalent to `-y_i * log(htheta_i) - (1 - y_i) * log(1- htheta_i)` but without running into numerical problems that essentially stem from `htheta_i` being equal to 0 or 1 within the limits of double precision floating point.

• Can you elaborate? I did not understand how this will avoid NaN or Inf case. Thanks. – Neel Shah Feb 16 '16 at 19:18
• @NeelShah The reason why is because this explicitly avoids the multiplication of `0*log(0)` if the situation were to arise. By indexing into your hypothesis and selecting out those values that belong to each class respectively, this avoids having any `NaN` values that may result in the sum computation. Your true reason why you are getting `NaN` is because your learning rate is too large, but what Matthew has suggested is great for making a more robust cost function. – rayryeng - Reinstate Monica Feb 16 '16 at 19:19
• BTW Matthew, you may get a dimension mismatch because indexing using `y_logical` and `~y_logical` may produce different sized vectors. I would suggest splitting up the `sum` into two separate operations... those where `y == 1` and those where `y == 0` then adding the two results together. – rayryeng - Reinstate Monica Feb 16 '16 at 19:22
• @NeelShah Something like: `cost = sum(-log(htheta(y == 1))) + sum(-log(1 - htheta(y == 0)));` should do nicely. – rayryeng - Reinstate Monica Feb 16 '16 at 19:56
• @codewarrior In Matlab, let's say you have a vector `x = [1, 2, 3, 4, 5, 6]';` you could do `y = x([1,0,1,1,0,1]')` and then `y` would be equal to `[1, 3, 4, 6]`. It's kind of like a .selectSubsetBasedOnLogicalMask function. Go to logical indexing on this page: mathworks.com/company/newsletters/articles/… – Matthew Gunn Oct 8 '16 at 1:35