# Neural Network Toolbox in Matlab get different results each time even if the initial weights are all zeros

Why should be closed and reopened the MATLAB windows for again running the neural network in order to get the same result? What parameters are effectively in this process?

EDIT (More details on my problem) If I don't close all windows of MATLAB and don't re-open them to run another net (such as run by another number of neurons), the obtained results is different from every time that I close and reopen the windows. For example: I run the ANN by 5 neurons in hidden layer and get the R(1)=0.97, then I close and reopen my m.file and run by 5 neurons and get R(2)=0.58.Now, if I don't close and don't reopen, I may get R(1)=0.99 and R(2)=0.7 (R is regression). What parameters is effective so that these answers be different?

my code is as follow:

``````clc
clear
for m=6:7

% P is input matrix for training
% T is output matrix

[Pn,minP,maxP,Tn,minT,maxT] = premnmx(P,T);

net=newff(minmax(Pn),[m,1],{'logsig','purelin'},'trainlm');

net.trainParam.show =100;
net.trainParam.lr = 0.09;
net.trainParam.epochs =1000;
net.trainParam.goal = 1e-3;

[net,tr]=train(net,Pn,Tn);
diff= sim(net,Pn);
diff1 = postmnmx(diff,minT,maxT)

%testing===================================================================
[Pn,minP,maxP,Tn,minT,maxT] = premnmx(P,T);
% Pt is input matrix data for testing
% Tt is output matrix data for testing

Ptn = tramnmx(Pt,minP,maxP)
diff= sim(net,Ptn);
diff2 = postmnmx(diff,minT,maxT)

msetr=mse(diff1-T)
msets=mse(diff2-Tt)

y=(1/n)*sum(diff2); % n is number of testing data
R2=((sum((Tt-y).^2))-(sum((diff2-Tt).^2)))/(sum((Tt-y).^2))

net.IW{1,1}=zeros(m,5);
net.LW{2,1}=zeros(2,m);
net.b{1,1}=zeros(m,1);
net.b{2,1}=zeros(2,1);

end
``````

when I run that, the answers for each number of neurons is different from time which I don't use a "for.. end" loop and run for each number of neurons by reopening the m-file and MATLAB windows. However I give zero value to weights, didn't solve my problem.

-

I'm not quite sure what do you mean by Matlab windows, but you can control the pop-up of nntraintool GUI (`nntraintool('close')`) by putting

``````yournet.trainParam.showWindow = false;
yournet.trainParam.showCommandLine = false;
``````

after your network `yournet`'s definition but before the training function.

EDIT: my reply to the OP's EDIT I attached my training and test code based on yours, I tried to learn `y = x.^2`, and my training data is [1,3,5,7,9] for `x`, and [2,4,6,8] for test. Yet I should say I got different weights every time even if the initial weights are all zero. That means given the hidden layer nodes of 6 or 7, the back propagation won't achieve unique solution. Please see my revisions below:

``````clc
clear

for m=6:7

% P is input matrix for training
% T is output matrix
P=[1 3 5 7 9];
T=P.^2;
[Pn,minP,maxP,Tn,minT,maxT] = premnmx(P,T);
clear net
net.IW{1,1}=zeros(m,1);
net.LW{2,1}=zeros(1,m);
net.b{1,1}=zeros(m,1);
net.b{2,1}=zeros(1,1);
net=newff(minmax(Pn),[m,1],{'logsig','purelin'},'trainlm');

net.trainParam.show =100;
net.trainParam.lr = 0.09;
net.trainParam.epochs =1000;
net.trainParam.goal = 1e-3;

[net,tr]=train(net,Pn,Tn);
diff= sim(net,Pn);
diff1 = postmnmx(diff,minT,maxT)

%testing===================================================================
[Pn,minP,maxP,Tn,minT,maxT] = premnmx(P,T);
% Pt is input matrix data for testing
% Tt is output matrix data for testing
Pt=[2 4 6 8];
Tt=Pt.^2;
n=length(Pt);
Ptn = tramnmx(Pt,minP,maxP)
diff= sim(net,Ptn);
diff2 = postmnmx(diff,minT,maxT)

msetr=mse(diff1-T)
msets=mse(diff2-Tt)

y=(1/n)*sum(diff2); % n is number of testing data
R2=((sum((Tt-y).^2))-(sum((diff2-Tt).^2)))/(sum((Tt-y).^2))

end
``````

``````aa=net.LW(2,1);
aa{1}
``````

right before

``````[net,tr]=train(net,Pn,Tn);
``````

you will find the weights are different every time you run it. Different Matlab Neural networks toolbox results is because of two reasons: (1) random data division, and (2) random weight initialization. Even if you zerolize the initial weight every time that you avoid (2), (1) still exists since `dividerand` randomizes the order of the input/target pairs.

One trick to compromise this is to record the first time's weight. In my case, I added:

``````   bb = [ -0.2013   -0.8314    0.4717    0.4266    0.1441   -0.6205];
net.LW{2,1} = bb;
bbb = [-16.7956 -16.8096 16.8002 16.8001 -16.8101 -16.8416]';
net.IW{1}=bbb;
bbbb=0.2039;
bbbbb=[-16.8044 -10.0608 3.3530 -3.3563 -10.0588 -16.7584]';
net.b{1}=bbbbb;
net.b{2}=bbbb;
``````

before `[net,tr]=train(net,Pn,Tn);`, then the result won't change. You may need to work on your own case by recording the `net.b`, `net.IW`, and `net.LW` values, and use them every time in your loop (`save` your `net` for the 1st trial run, and `load net` to get the value of `net.b`, `net.IW`, and `net.LW` in your loop run).

Yet I don't think this method make much sense. What I highly recommend you is to:

1. Initialize the rand weights.

2. Use an outer loop that specifies the number of hidden nodes,`m`

3. Use an inner loop that creates a net with a new set of random initial weights for each m; then trains, evaluates, and stores the `R2` in a 2-D matrix.

4. Search the stored results for the smallest net with an acceptable performance, record the `m`.

5. Run several times in a loop with the determined `m` values and only store the index or weights of the current best design.

6. Select the weights with best performance

-
If I don't close all windows of MATLAB and don't reopenning them to run another net (such as run by another number of neurons), the obtained results is different from every time that I close and reopen the windows. For example: I run the ANN by 5 neurons in hidden layer and get the R(1)=0.97, then I close and reopen my m.file and run by 5 neurons and get R(2)=0.58.Now, if I don't close and don't reopen, I may get R(1)=0.99 and R(2)=0.7 (R is regression).What parameters is effective so that these answers be different? –  skbn Dec 25 '13 at 16:32
it is possible that you get different results. It's due to the weight initialization (every time you re-run the program the initial weights are different). Yet I don't think it has something to do with close-open windows. –  lennon310 Dec 25 '13 at 16:37
I give zero value to every weights and layer weights and biases (I done this work as I use a "for..end" loop (for example: for m=0:10 so that m is the number of neurons in hidden layer) and give zero value to every weights at before I write "end". But answers were different. may should write ANN without matlab tools! how can done it? –  skbn Dec 25 '13 at 17:11
your hidden layers are different each time? so definitely the R will not be the same. I would suggest you paste your code on your original post by clicking 'edit', so people can find out more details. –  lennon310 Dec 25 '13 at 17:18
yes, my number of neurons in each layer is different each time. please see my code which added in my original post –  skbn Dec 25 '13 at 17:41