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Adding a tutorial on adding new parabolic terms (#1209)
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| #src # Adding new parabolic terms. | ||
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| # This demo illustrates the steps involved in adding new parabolic terms for the scalar | ||
| # advection equation. In particular, we will add an anisotropic diffusion. We begin by | ||
| # defining the hyperbolic (advection) part of the advection-diffusion equation. | ||
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| using OrdinaryDiffEq | ||
| using Trixi | ||
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| advection_velocity = (1.0, 1.0) | ||
| equations_hyperbolic = LinearScalarAdvectionEquation2D(advection_velocity); | ||
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| # ## Define a new parabolic equation type | ||
| # | ||
| # Next, we define a 2D parabolic diffusion term type. This is similar to [`LaplaceDiffusion2D`](@ref) | ||
| # except that the `diffusivity` field refers to a spatially constant diffusivity matrix now. Note that | ||
| # `ConstantAnisotropicDiffusion2D` has a field for `equations_hyperbolic`. It is useful to have | ||
| # information about the hyperbolic system available to the parabolic part so that we can reuse | ||
| # functions defined for hyperbolic equations (such as `varnames`). | ||
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| struct ConstantAnisotropicDiffusion2D{E, T} <: Trixi.AbstractEquationsParabolic{2, 1} | ||
| diffusivity::T | ||
| equations_hyperbolic::E | ||
| end | ||
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| varnames(variable_mapping, equations_parabolic::ConstantAnisotropicDiffusion2D) = | ||
| varnames(variable_mapping, equations_parabolic.equations_hyperbolic) | ||
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| # Next, we define the viscous flux function. We assume that the mixed hyperbolic-parabolic system | ||
| # is of the form | ||
| # ```math | ||
| # \partial_t u(t,x) + \partial_x (f_1(u) - g_1(u, \nabla u)) | ||
| # + \partial_y (f_2(u) - g_2(u, \nabla u)) = 0 | ||
| # ``` | ||
| # where ``f_1(u)``, ``f_2(u)`` are the hyperbolic fluxes and ``g_1(u, \nabla u)``, ``g_2(u, \nabla u)`` denote | ||
| # the viscous fluxes. For anisotropic diffusion, the viscous fluxes are the first and second components | ||
| # of the matrix-vector product involving `diffusivity` and the gradient vector. | ||
| # | ||
| # Here, we specialize the flux to our new parabolic equation type `ConstantAnisotropicDiffusion2D`. | ||
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| function Trixi.flux(u, gradients, orientation::Integer, equations_parabolic::ConstantAnisotropicDiffusion2D) | ||
| @unpack diffusivity = equations_parabolic | ||
| dudx, dudy = gradients | ||
| if orientation == 1 | ||
| return SVector(diffusivity[1, 1] * dudx + diffusivity[1, 2] * dudy) | ||
| else # if orientation == 2 | ||
| return SVector(diffusivity[2, 1] * dudx + diffusivity[2, 2] * dudy) | ||
| end | ||
| end | ||
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| # ## Defining boundary conditions | ||
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| # Trixi.jl's implementation of parabolic terms discretizes both the gradient and divergence | ||
| # using weak formulation. In other words, we discretize the system | ||
| # ```math | ||
| # \begin{aligned} | ||
| # \bm{q} &= \nabla u \\ | ||
| # \bm{\sigma} &= \begin{pmatrix} g_1(u, \bm{q}) \\ g_2(u, \bm{q}) \end{pmatrix} \\ | ||
| # \text{viscous contribution } &= \nabla \cdot \bm{\sigma} | ||
| # \end{aligned} | ||
| # ``` | ||
| # | ||
| # Boundary data must be specified for all spatial derivatives, e.g., for both the gradient | ||
| # equation ``\bm{q} = \nabla u`` and the divergence of the viscous flux | ||
| # ``\nabla \cdot \bm{\sigma}``. We account for this by introducing internal `Gradient` | ||
| # and `Divergence` types which are used to dispatch on each type of boundary condition. | ||
| # | ||
| # As an example, let us introduce a Dirichlet boundary condition with constant boundary data. | ||
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| struct BoundaryConditionConstantDirichlet{T <: Real} | ||
| boundary_value::T | ||
| end | ||
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| # This boundary condition contains only the field `boundary_value`, which we assume to be some | ||
| # real-valued constant which we will impose as the Dirichlet data on the boundary. | ||
| # | ||
| # Boundary conditions have generally been defined as "callable structs" (also known as "functors"). | ||
| # For each boundary condition, we need to specify the appropriate boundary data to return for both | ||
| # the `Gradient` and `Divergence`. Since the gradient is operating on the solution `u`, the boundary | ||
| # data should be the value of `u`, and we can directly impose Dirichlet data. | ||
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| @inline function (boundary_condition::BoundaryConditionConstantDirichlet)(flux_inner, u_inner, normal::AbstractVector, | ||
| x, t, operator_type::Trixi.Gradient, | ||
| equations_parabolic::ConstantAnisotropicDiffusion2D) | ||
| return boundary_condition.boundary_value | ||
| end | ||
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| # While the gradient acts on the solution `u`, the divergence acts on the viscous flux ``\bm{\sigma}``. | ||
| # Thus, we have to supply boundary data for the `Divergence` operator that corresponds to ``\bm{\sigma}``. | ||
| # However, we've already imposed boundary data on `u` for a Dirichlet boundary condition, and imposing | ||
| # boundary data for ``\bm{\sigma}`` might overconstrain our problem. | ||
| # | ||
| # Thus, for the `Divergence` boundary data under a Dirichlet boundary condition, we simply return | ||
| # `flux_inner`, which is boundary data for ``\bm{\sigma}`` computed using the "inner" or interior solution. | ||
| # This way, we supply boundary data for the divergence operation without imposing any additional conditions. | ||
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| @inline function (boundary_condition::BoundaryConditionConstantDirichlet)(flux_inner, u_inner, normal::AbstractVector, | ||
| x, t, operator_type::Trixi.Divergence, | ||
| equations_parabolic::ConstantAnisotropicDiffusion2D) | ||
| return flux_inner | ||
| end | ||
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| # ### A note on the choice of gradient variables | ||
| # | ||
| # It is often simpler to transform the solution variables (and solution gradients) to another set of | ||
| # variables prior to computing the viscous fluxes (see [`CompressibleNavierStokesDiffusion2D`](@ref) | ||
| # for an example of this). If this is done, then the boundary condition for the `Gradient` operator | ||
| # should be modified accordingly as well. | ||
| # | ||
| # ## Putting things together | ||
| # | ||
| # Finally, we can instantiate our new parabolic equation type, define boundary conditions, | ||
| # and run a simulation. The specific anisotropic diffusion matrix we use produces more | ||
| # dissipation in the direction ``(1, -1)`` as an isotropic diffusion. | ||
| # | ||
| # For boundary conditions, we impose that ``u=1`` on the left wall, ``u=2`` on the bottom | ||
| # wall, and ``u = 0`` on the outflow walls. The initial condition is taken to be ``u = 0``. | ||
| # Note that we use `BoundaryConditionConstantDirichlet` only for the parabolic boundary | ||
| # conditions, since we have not defined its behavior for the hyperbolic part. | ||
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| using Trixi: SMatrix | ||
| diffusivity = 5.0e-2 * SMatrix{2, 2}([2 -1; -1 2]) | ||
| equations_parabolic = ConstantAnisotropicDiffusion2D(diffusivity, equations_hyperbolic); | ||
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| boundary_conditions_hyperbolic = (; x_neg = BoundaryConditionDirichlet((x, t, equations) -> SVector(1.0)), | ||
| y_neg = BoundaryConditionDirichlet((x, t, equations) -> SVector(2.0)), | ||
| y_pos = boundary_condition_do_nothing, | ||
| x_pos = boundary_condition_do_nothing) | ||
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| boundary_conditions_parabolic = (; x_neg = BoundaryConditionConstantDirichlet(1.0), | ||
| y_neg = BoundaryConditionConstantDirichlet(2.0), | ||
| y_pos = BoundaryConditionConstantDirichlet(0.0), | ||
| x_pos = BoundaryConditionConstantDirichlet(0.0)); | ||
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| solver = DGSEM(polydeg=3, surface_flux=flux_lax_friedrichs) | ||
| coordinates_min = (-1.0, -1.0) # minimum coordinates (min(x), min(y)) | ||
| coordinates_max = ( 1.0, 1.0) # maximum coordinates (max(x), max(y)) | ||
| mesh = TreeMesh(coordinates_min, coordinates_max, | ||
| initial_refinement_level=4, | ||
| periodicity=false, n_cells_max=30_000) # set maximum capacity of tree data structure | ||
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| initial_condition = (x, t, equations) -> SVector(0.0) | ||
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| semi = SemidiscretizationHyperbolicParabolic(mesh, | ||
| (equations_hyperbolic, equations_parabolic), | ||
| initial_condition, solver; | ||
| boundary_conditions=(boundary_conditions_hyperbolic, | ||
| boundary_conditions_parabolic)) | ||
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| tspan = (0.0, 2.0) | ||
| ode = semidiscretize(semi, tspan) | ||
| callbacks = CallbackSet(SummaryCallback()) | ||
| time_int_tol = 1.0e-6 | ||
| sol = solve(ode, RDPK3SpFSAL49(), abstol=time_int_tol, reltol=time_int_tol, | ||
| save_everystep=false, callback=callbacks); | ||
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| using Plots | ||
| plot(sol) | ||
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