# The Free energy approximation Equation in Restriction Boltzmann Machines

According a deeplearning tutorial:

The free energy in python is

``````def free_energy(self, v_sample):
''' Function to compute the free energy '''
wx_b = T.dot(v_sample, self.W) + self.hbias
vbias_term = T.dot(v_sample, self.vbias)
hidden_term = T.sum(T.log(1 + T.exp(wx_b)), axis=1)
return -hidden_term - vbias_term
``````

I am not very good at python, basically it get product expert of each visible unit as vector wx_b, calculate exp and plus 1 , calculate log and sum it for the hidden term.

Which I believe is a little different than free energy equation in the Learning Deep Architectures:

FreeEnergy(x) = −b′x − ∑log∑e^hi(ci+Wix).

Where:

• `hi` is the unit `i` hidden layer,
• `ci` is the `i` hidden bias in vector c.

It calculates exp and sum, calculate log respect to the sum value. after all sum all the product expert based on the number of visible unit.

The above equation is eq.5.21 from Learning Deep Architectures for AI (Yoshua Bengio)

Below is my draft of java implementation vis_v is the visible layer sample, hid_v is the hidden layer unit sample.

``````private double freeEnergy(RealVector vis_v, RealVector hid_v){
double vbias_term= vis_v.dotProduct(vBias);
double sum_hidden_term = 0;
for(int i=0;i< wx_hb.getDimension();i++){
RealVector vis_expert = hid_v.mapMultiply(wx_hb.getEntry(i));
double hidden_term= StatUtils.sum(vis_expert.map(new Exp()).toArray());
sum_hidden_term+=Math.log(hidden_term);
}
return -sum_hidden_term-vbias_term;
}
``````

Is this some kind of approximation? I am trying to implement the same thing in java, but am getting confused over it. Thanks in advance for any help!

-
Yowser! That's a change from the usual kind of question we get on stackoverflow :) Let me take a deeper look to see what's what. –  brice Mar 30 '12 at 14:12
As an aside, there is a quick way to check your code: run it and see if it differs from the reference version... –  brice Mar 30 '12 at 14:43
thanks, brice. I have run my code against some real example , it works. I believe the python example works too. I need to find out which one more optimize, it might help reduce the deep network error in future, even 0.1~0.2% is worth. –  ryo Mar 30 '12 at 15:43
Since I'm at work, I was going to take a look at this on coming home. It sounds like you're working on interesting stuff there ryo. –  brice Mar 30 '12 at 15:51