I try to solve U_t = U_xx equation with Matlab. I've copied and modified function from matlab help:
function pdex1 m = 0; x = linspace(0,300,3); t = linspace(0,5,5); sol = pdepe(m,@pdex1pde,@pdex1ic,@pdex1bc,x,t); u = sol(:,:,1); function [c,f,s] = pdex1pde(x,t,u,DuDx) c = 1; f = DuDx; s = 0; function u0 = pdex1ic(x) u0 = 100; function [pl,ql,pr,qr] = pdex1bc(xl,ul,xr,ur,t) pl = ul - heaviside(t); pr = ur - t; ql = 0; qr = 0;
And now it can't solve this due to:
Failure at t=0.000000e+000. Unable to meet integration tolerances without reducing the step size below the smallest value allowed (7.905050e-323) at time t.
I suppose that this happens because boundary conditions can't be differentiated at 0 timestep. Is it right?