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I´m trying to approximate the partial derivative of the output with respect to the input.

As you can see in "derivative" I develop chain rule to obtain the derivative of the function (dy/dx). Could you let me know where I am having a bug? The result (dout) is not what I expected.

Thanks a lot

x = linspace(-100,50,300);        # 1D input
y_adj = x;                        %# model
y = y_adj + 10*randn(size(x)).*x;  %# add some noise

%%# create ANN, train, simulate

net = newpr(x, y, 2);   %2 hidden layers
net.divideFcn = '';
net = init(net);
net.trainParam.epochs = 300;
net = train(net, x, y);
outputPredicted = sim(net, x);


%% inserting in the interval

[pn,ps] = mapminmax(x);
[tn,ts] = mapminmax(y);


%%simulating the net by myself

for i=1:size(x,2)
    in = pn(:,i);             %# i-th input vector
    hidden(1) = tansig( net.IW{1}(1,1)*in(1) + net.b{1}(1) );   %IW depende del número de     variables del modelo (1,2),(1,3)...
    hidden(2) = tansig( net.IW{1}(2,1)*in(1)  + net.b{1}(2) );
    outLayerOut(i) = tansig( hidden(1)*net.LW{2,1}(1) + hidden(2)*net.LW{2,1}(2) + net.b{2} );
end

out = mapminmax('reverse',outLayerOut,ts);

%%%DERIVATIVE


for i=1:size(x,2)
    in = scaledIn(:,i);             %# i-th input vector
    hidden(1) = tansig( net.IW{1}(1,1)*in(1) + net.b{1}(1) );   %IW depende del número de variables del modelo (1,2),(1,3)...
    hidden(2) = tansig( net.IW{1}(2,1)*in(1)  + net.b{1}(2) );
    dhidden(1) =(1-hidden(1).^2)*net.IW{1}(1,1);  %IW depende del número de variables del modelo (1,2),(1,3)...
    dhidden(2) = (1-hidden(2).^2)*net.IW{1}(2,1);
    doutLayerOut(i) = (1-outLayerOut(i)^2)*(dhidden(1)*net.LW{2,1}(1)+dhidden(2)*net.LW{2,1}(2) );
end

dout = mapminmax('reverse',doutLayerOut,ts);
share|improve this question
    
What happens when you give -sin(x) to input and cos(x) to output? Can it learn that? –  huseyin tugrul buyukisik Sep 13 '13 at 12:08
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