# Numerically Stable Implementation

I need to compute a normalized exponential of a vector in Matlab.

Simply writing

``````res = exp(V)/sum(exp(V))
``````

overflows in an element of V is greater than log(realmax) = 709.7827. (I am not sure about underflow conditions.)

How should I implement it to avoid numerical instability?

Update: I received excellent responses about how to avoid overflow. However, I am still happy to hear your thoughts about the possibility of underflow in the code.

The following approach avoids the overflow by subtracting the exponents and then taking the exponential, instead of dividing the exponentials:

``````res = 1./sum(exp(bsxfun(@minus, V(:), V(:).')))
``````

As a general rule, overflow can be avoided by working in the log domain for as long as possible, and taking the exponential only at the end.

• Thanks. I am new to bsxfun. What if V is a matrix, and we want this to apply along dimension dim? – user25004 May 14 '14 at 22:00
• @user25004 How would that be? `exp(V)` would then be a matrix and `sum(exp(V),dim)` would be a vector. How do you define `exp(V)/sum(exp(V,dim))` in that case? – Luis Mendo May 14 '14 at 22:03
• I mean if the variable called dim is 1, I want your previous code to be applied to each column. If dim is 2, the code is applied row-wise. – user25004 May 14 '14 at 22:14
• @user25004 That would be harder. And it changes the question completely. The simple answer would be: loop over each row or column. – Luis Mendo May 14 '14 at 22:15
• @user25004 Welcome! Feel free to ask that new requirement as a new question, if the loop solution is not good enough – Luis Mendo May 14 '14 at 22:17

``````exp(V)=exp(V-max(V))*exp(max(V))
sum(exp(V))=sum(exp(V-max(V))*exp(max(V)))=exp(max(V)*sum(exp(V-max(V))))
``````

Putting both together:

``````res=exp(V-max(V))*exp(max(V))/exp(max(V)*sum(exp(V-max(V)))=exp(V-max(V))/sum(exp(V-max(V)))
``````

A code which is robust to the input range:

``````res=exp(V-max(V))/sum(exp(V-max(V)))
``````
• Nice idea! Subtract the maximum – Luis Mendo May 14 '14 at 21:57