/// <summary> /// Obtaining the time integrated spatial discretization of the reinitialization equation in a narrow band around the zero level set, based on a Godunov's numerical Hamiltonian calculation /// </summary> /// <param name="LS"> The level set function </param> /// <param name="Restriction"> The narrow band around the zero level set </param> /// <param name="NumberOfTimesteps"> /// maximum number of pseudo-timesteps /// </param> /// <param name="thickness"> /// The smoothing width of the signum function. /// This is the main stabilization parameter for re-initialization. /// It should be set to approximately 3 cells. /// </param> /// <param name="TimestepSize"> /// size of the pseudo-timestep /// </param> public void ReInitialize(LevelSet LS, SubGrid Restriction, double thickness, double TimestepSize, int NumberOfTimesteps) { using (var tr = new FuncTrace()) { // log parameters: tr.Info("thickness: " + thickness.ToString(NumberFormatInfo.InvariantInfo)); tr.Info("TimestepSize: " + TimestepSize.ToString(NumberFormatInfo.InvariantInfo)); tr.Info("NumberOfTimesteps: " + NumberOfTimesteps); ExplicitEuler TimeIntegrator; SpatialOperator SO; Func <int[], int[], int[], int> QuadratureOrder = QuadOrderFunc.NonLinear(3); if (m_ctx.SpatialDimension == 2) { SO = new SpatialOperator(1, 5, 1, QuadratureOrder, new string[] { "LS", "LSCGV", "LSDG[0]", "LSUG[0]", "LSDG[1]", "LSUG[1]", "Result" }); SO.EquationComponents["Result"].Add(new GodunovHamiltonian(m_ctx, thickness)); SO.Commit(); TimeIntegrator = new RungeKutta(m_Scheme, SO, new CoordinateMapping(LS), new CoordinateMapping(LSCGV, LSDG[0], LSUG[0], LSDG[1], LSUG[1]), sgrd: Restriction); } else { SO = new SpatialOperator(1, 7, 1, QuadratureOrder, new string[] { "LS", "LSCGV", "LSDG[0]", "LSUG[0]", "LSDG[1]", "LSUG[1]", "LSDG[2]", "LSUG[2]", "Result" }); SO.EquationComponents["Result"].Add(new GodunovHamiltonian(m_ctx, thickness)); SO.Commit(); TimeIntegrator = new RungeKutta(m_Scheme, SO, new CoordinateMapping(LS), new CoordinateMapping(LSCGV, LSDG[0], LSUG[0], LSDG[1], LSUG[1], LSDG[2], LSUG[2]), sgrd: Restriction); } // Calculating the gradients in each sub-stage of a Runge-Kutta integration procedure ExplicitEuler.ChangeRateCallback EvalGradients = delegate(double t1, double t2) { LSUG.Clear(); CalculateLevelSetGradient(LS, LSUG, "Upwind", Restriction); LSDG.Clear(); CalculateLevelSetGradient(LS, LSDG, "Downwind", Restriction); LSCG.Clear(); CalculateLevelSetGradient(LS, LSCG, "Central", Restriction); LSCGV.Clear(); var VolMask = (Restriction != null) ? Restriction.VolumeMask : null; LSCGV.ProjectAbs(1.0, VolMask, LSCG.ToArray()); }; TimeIntegrator.OnBeforeComputeChangeRate += EvalGradients; { EvalGradients(0, 0); var GodunovResi = new SinglePhaseField(LS.Basis, "Residual"); SO.Evaluate(1.0, 0.0, LS.Mapping, TimeIntegrator.ParameterMapping.Fields, GodunovResi.Mapping, Restriction); //Tecplot.Tecplot.PlotFields(ArrayTools.Cat<DGField>( LSUG, LSDG, LS, GodunovResi), "Residual", 0, 3); } // pseudo-timestepping // =================== double factor = 1.0; double time = 0; LevelSet prevLevSet = new LevelSet(LS.Basis, "prevLevSet"); CellMask RestrictionMask = (Restriction == null) ? null : Restriction.VolumeMask; for (int i = 0; (i < NumberOfTimesteps); i++) { tr.Info("Level set reinitialization pseudo-timestepping, timestep " + i); // backup old Levelset // ------------------- prevLevSet.Clear(); prevLevSet.Acc(1.0, LS, RestrictionMask); // time integration // ---------------- double dt = TimestepSize * factor; tr.Info("dt = " + dt.ToString(NumberFormatInfo.InvariantInfo) + " (factor = " + factor.ToString(NumberFormatInfo.InvariantInfo) + ")"); TimeIntegrator.Perform(dt); time += dt; // change norm // ------ prevLevSet.Acc(-1.0, LS, RestrictionMask); double ChangeNorm = prevLevSet.L2Norm(RestrictionMask); Console.WriteLine("Reinit: PseudoTime: {0} - Changenorm: {1}", i, ChangeNorm); //Tecplot.Tecplot.PlotFields(new SinglePhaseField[] { LS }, m_ctx, "Reinit-" + i, "Reinit-" + i, i, 3); } //*/ } }