I'm trying to prescribe free boundary conditions for a non-linear evolution equation in mathematica and I wanted as second opinion on whether or not what I am doing is right.

The boundary conditions have been marked with a comment, viz., (*FREE BOUNDARY CONDITIONS*)

I'd also like to run this for pinned boundary conditions.

```
Needs["VectorAnalysis`"]
Needs["DifferentialEquations`InterpolatingFunctionAnatomy`"];
Clear[Eq5, Complete, h, S, G, E1, K1, D1, VR, M]
Eq5[h_, {S_, G_, E1_, K1_, D1_, VR_, M_}] := \!\(
\*SubscriptBox[\(\[PartialD]\), \(t\)]h\) +
Div[-h^3 G Grad[h] +
h^3 S Grad[Laplacian[h]] + (VR E1^2 h^3)/(D1 (h + K1)^3)
Grad[h] + M (h/(1 + h))^2 Grad[h]] + E1/(h + K1) == 0;
SetCoordinates[Cartesian[x, y, z]];
Complete[S_, G_, E1_, K1_, D1_, VR_, M_] :=
Eq5[h[x, y, t], {S, G, E1, K1, D1, VR, M}];
TraditionalForm[Complete[S, G, E1, K1, D1, VR, M]]
L = 185.62; TMax = 100; km = 0.0381;
Off[NDSolve::mxsst];
Off[NDSolve::ibcinc];
hSol = h /. NDSolve[{Complete[100, 0, 0, 0, 0.001, 0, 5],
(*FREE BOUNDARY CONDITIONS*)
Derivative[2, 0, 0][h][0, y, t] == 0,
Derivative[2, 0, 0][h][L, y, t] == 0,
Derivative[0, 2, 0][h][x, 0, t] == 0,
Derivative[0, 2, 0][h][x, L, t] == 0,
Derivative[3, 0, 0][h][0, y, t] == 0,
Derivative[3, 0, 0][h][L, y, t] == 0,
Derivative[0, 3, 0][h][x, 0, t] == 0,
Derivative[0, 3, 0][h][x, L, t] == 0,
(*FREE BOUNDARY CONDITIONS*)
h[x, y, 0] == 1 + (-0.05*Cos[2*Pi*(x/L)] - 0.05*Sin[2*Pi*(x/L)])*
Cos[2*Pi*(y/L)]},
h, {x, 0, L}, {y, 0, L}, {t, 0, TMax}][[1]]
hGrid = InterpolatingFunction[hSol];
{TMin, TRup} = InterpolatingFunctionDomain[hSol][[3]]
```

`hsol`

on the penultimate line of your code should have been`hSol`

(with a capital S). Since`hSol`

is already an`InterplatingFunction`

the definition of`hGrid`

doesn't really make sense. – Heike Jan 11 '12 at 15:36