Physics informed Neural Network

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Sankarganesh P
Sankarganesh P on 11 Jul 2023
Commented: Sankarganesh P on 27 Jul 2023
Dear Matlab Community Members,
i would like to apply my equations in physics-informed neural networks, so i reffered solving Burger's equation L-BFGS method. For example i would like to apply 1D equation
d^u/dt=(d^2g/dx^2)-d^4u/dx^4; where g=2*u*(1-u)*(1-2*u) with
u(x=0,t)=0, u(x=1,t)=0 and
u(t=0,x)=sin(4*pi*x/L)
Model Loss Function
%%%%%%%%%%%%%%%%%%%%%%%%%%%%
U = model(parameters,X,T);
G=2.*U.*(1-U).*(1-2.*U);
gradientsG = dlgradient(sum(G,"all"),{X,T},EnableHigherDerivatives=true);
Gx = gradientsG{1};
Gxx = dlgradient(sum(Gx,"all"),X,EnableHigherDerivatives=true);
gradientsU = dlgradient(sum(U,"all"),{X,T},EnableHigherDerivatives=true);
Ux = gradientsU{1};
Ut = gradientsU{2};
Uxx = dlgradient(sum(Ux,"all"),X,EnableHigherDerivatives=true);
Uxxx = dlgradient(sum(Uxx,"all"),X,EnableHigherDerivatives=true);
Uxxxx = dlgradient(sum(Uxxx,"all"),X,EnableHigherDerivatives=true);
f=Ut-Gxx+2.*Uxxxx;
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
i have made the above changes in the code...but i didnt get any expected results....can u please help me with this...?
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Ben
Ben on 26 Jul 2023
@Sankarganesh P I notice that your ODE is
but the model loss function uses 2.*Uxxxx. That seems like an issue at first glance.
Otherwise your model loss function looks as expected to me. Do you get good training losses?
Of course a small training loss only means the network is "nearly" solving the ODE at the training points - for complex ODEs/PDEs this may only give weak approximations to the true solution in general.
Sankarganesh P
Sankarganesh P on 27 Jul 2023
@Ben Thankz for the correction. i will try now... is it possible to use this LBFGS for 2D problems like d^2T/dx^2+d^2T/dy^2=DT/dt..?

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