Error imposing space-deri​vative-dep​endent boundary condition with solvepde using variable state.uy - Error: Unrecognized field name "uy".

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I would appreciate any advice of the following. I am working with PDE Tool box solvepde and a 2d membrane simulation and struggling to impose a spatial-derivative-dependent absorbing a boundary condition on an edge. I am following PDE Toolbox documentation trying two different methods, one (commented out) below using a simple anonymous function and another using a matlab function. These methods work with variables like location.x, location.y, and state.time but seem to fail me with the spatial derivatives. Here is the code snippet in the setup preamble to calling solvepde:
case 3
alpha_absorb=1;beta_absorb=0.0;
m3=m_func(0,ribbonlength/2);
c3=c_func(0,ribbonlength/2);
v3=sqrt(c3(3)/m3);
% my_g= @(location, state,alpha,beta) (-alpha_y *v3.* state.uy +beta_y*state.uyy);
%
% g=@(location,state)(-alpha_y *v3.* state.uy +beta_y*state.uyy)
g=@(location,state) my_g(location, state,alpha_absorb,beta_absorb,v3);
applyBoundaryCondition(model, 'neumann', 'Edge', topEdgeID, "q",0,...
'g', g);
end
function absorb=my_g(location, state,alpha_absorb,beta_absorb,v3)
n1=1;
nr=numel(location.x);
absorb=zeros(n1,nr);
absorb(1,:)=(-alpha_absorb *v3.* state.uy +beta_absorb*state.uyy);
end
For the method shown, solvepde throws the following error ( and the commented out anonymous functio method throws a similar error)
Unrecognized field name "uy".
absorb(1,:)=(-alpha_absorb *v3.* state.uy +beta_absorb*state.uyy);
g=@(location,state) my_g(location, state,alpha_absorb,beta_absorb,v3)
bci = func(appRegion, state);
faceG = self.callNeumannFuncOnFace(bci,xyzAllFaceNodes, sPts, bci.g, ...
[Qi, Gi] = setNeumannBCOnFace(self, bcsi);
bcmat = bcImpl.getBCMatrices(u,time,gmat);
bmat = self.assembleBoundary(u,time,gmatrix);
femat0 = self.thePde.assembleSelectedFEMatrices(self.p, self.t, self.coefstruct, u0, tdummy, requiredMats, false);
obj = obj.initialDiscretization(u0,tdummy);
obj=obj@pde.DiscretizedPDEModel(thePde,p,e,t,coefstruct,u0,false);
femodel=pde.DynamicDiscretizedPDEModel(self,p,e,t,coefstruct,u0,tlist,tsecondOrder);
[u,dudt] = self.solveTimeDependent(coefstruct, u0, ut0, tlist, ...

Respuesta aceptada

Torsten
Torsten el 4 de Ag. de 2024
Movida: Torsten el 4 de Ag. de 2024
According to the documentation (User's guide, page 2-128), g can be a function of x,y,t and u.
The boundary condition of a second-order PDE can never have u_yy in it, and u_y is already contained in n*(c*grad u).
  5 comentarios
Torsten
Torsten el 4 de Ag. de 2024
I don't have the necessary experience with the PDE Toolbox to answer your questions. I think it would be best if you contact the official MATLAB support for this:

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