A05 : Comparison with DifferentialEquations.jl
This example computes a transient velocity $\mathbf{u}$ solution of the nonlinear Poisson problem
\[\begin{aligned} \mathbf{u}_t - \mathrm{div}((1+\beta\mathbf{u}^2) \nabla \mathbf{u}) & = \mathbf{f}\\ \end{aligned}\]
with (some time-dependent) exterior force $\mathbf{f}$. The parameter $\beta$ steers the strength of the nonlinearity.
The time integration will be performed by a solver from DifferentialEquations.jl or by the iternal backward Euler method of GradientRobustMultiPhysics.
Note: To run this example the DifferentialEquations.jl package has to be installed.
module ExampleA05_DiffEQ
using GradientRobustMultiPhysics
using ExtendableGrids
using DifferentialEquations
# problem data
function exact_solution!(result,x, t)
result[1] = x[1]*x[2]*(1-t)
return nothing
end
function rhs!(beta)
function closure(result,x,t)
result[1] = -2*beta*(x[1]^3*x[2] + x[2]^3*x[1]) # = -div(beta*u^2*grad(u))
result .*= (1-t)^3
result[1] += -x[1]*x[2] ## = u_t
return nothing
end
end
# everything is wrapped in a main function
# the last four parametes steer the solver from DifferentialEquations.jl
# for beta = 0, abstol and reltol can be choosen much larger
function main(; verbosity = 0, nlevels = 3, timestep = 1e-1, T = 0.5, FEType = H1P1{1}, beta = 1,
use_diffeq::Bool = true,
solver = ImplicitEuler(autodiff = false),# Rosenbrock23(autodiff = false),
adaptive_timestep = true,
abstol = 1e-3,
reltol = 1e-3,
testmode = false)
# set log level
set_verbosity(verbosity)
# initial grid and final time
xgrid = uniform_refine(grid_unitsquare(Triangle2D),1);
# negotiate data functions to the package
u = DataFunction(exact_solution!, [1,2]; name = "u", dependencies = "XT", bonus_quadorder = 5)
∇u = ∇(u)
u_rhs = DataFunction(rhs!(beta), [1,1]; name = "f", dependencies = "XT", bonus_quadorder = 5)
# prepare nonlinear expression (1+u^2)*grad(u)
function diffusion_kernel!(result, input)
# input = [u, grad(u)]
result[1] = (1+beta*input[1]^2)*input[2]
result[2] = (1+beta*input[1]^2)*input[3]
return nothing
end
nonlin_diffusion = NonlinearForm(Gradient, [Identity, Gradient], [1,1], diffusion_kernel!, [2,3]; name = "(1+ βu^2) ∇u ⋅ ∇v", bonus_quadorder = 2, newton = true)
# generate problem description and assign nonlinear operator and data
Problem = PDEDescription(beta == 0 ? "linear Poisson problem" : "nonlinear Poisson problem")
add_unknown!(Problem; unknown_name = "u", equation_name = beta == 0 ? "linear Poisson problem" : "nonlinear Poisson equation")
add_operator!(Problem, [1,1], beta == 0 ? LaplaceOperator() : nonlin_diffusion)
add_boundarydata!(Problem, 1, [1,2,3,4], BestapproxDirichletBoundary; data = u)
add_rhsdata!(Problem, 1, LinearForm(Identity, u_rhs))
# define error evaluators
L2Error = L2ErrorIntegrator(u, Identity; time = T)
H1Error = L2ErrorIntegrator(∇u, Gradient; time = T)
Results = zeros(Float64, nlevels, 2); NDofs = zeros(Int, nlevels)
# loop over levels
for level = 1 : nlevels
# refine grid
xgrid = uniform_refine(xgrid)
# generate FESpace and solution vector
FES = FESpace{FEType}(xgrid)
Solution = FEVector(FES)
# set initial solution
interpolate!(Solution[1], u)
# generate time-dependent solver
sys = TimeControlSolver(Problem, Solution, BackwardEuler; timedependent_equations = [1], skip_update = [beta == 0 ? -1 : 1], nonlinear_iterations = beta == 0 ? 1 : 5)
if use_diffeq == true
# use time integration by DifferentialEquations
advance_until_time!(DifferentialEquations, sys, timestep, T; solver = solver, abstol = abstol, reltol = reltol, adaptive = adaptive_timestep)
else
# use time control solver by GradientRobustMultiPhysics
advance_until_time!(sys, timestep, T)
end
# compute L2 and H1 errors and save data
NDofs[level] = length(Solution.entries)
Results[level,1] = sqrt(evaluate(L2Error,Solution[1]))
Results[level,2] = sqrt(evaluate(H1Error,Solution[1]))
end
# print/plot convergence history
print_convergencehistory(NDofs, Results; X_to_h = X -> X.^(-1/2), ylabels = ["|| u - u_h ||", "|| ∇(u - u_h) ||"])
end
function test()
return main(; use_diffeq = false, nlevels = 1, testmode = true)
end
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