Holes in ElementMesh with ToElementMesh of ImplicitRegion












3












$begingroup$


I am trying to plot a function in a region below a level curve of the function and within a cell. I have been doing this by calculating an ElementMesh using ImplicitRegion and ToElementMesh, but the result has holes.



Here is the cell (it's just a square),



cell = Parallelogram[{-0.5`, -0.5`}, {{1.`, 0.`}, {0.`, 1.`}}];
Graphics[{Transparent, EdgeForm[Thick], cell}]


and the function,



f[kx_, ky_, n_] := 
Sort[Eigenvalues[{{(-1. + kx)^2 + (-1. + ky)^2, -0.23, 0., -0.23,
0.12, 0., 0., 0.,
0.}, {-0.23, (-1. + kx)^2 + (0. + ky)^2, -0.23, 0.12, -0.23,
0.12, 0., 0., 0.}, {0., -0.23, (-1. + kx)^2 + (1. + ky)^2, 0.,
0.12, -0.23, 0., 0., 0.}, {-0.23, 0.12,
0., (0. + kx)^2 + (-1. + ky)^2, -0.23, 0., -0.23, 0.12,
0.}, {0.12, -0.23,
0.12, -0.23, (0. + kx)^2 + (0. + ky)^2, -0.23, 0.12, -0.23,
0.12}, {0., 0.12, -0.23, 0., -0.23, (0. + kx)^2 + (1. + ky)^2,
0., 0.12, -0.23}, {0., 0., 0., -0.23, 0.12,
0., (1. + kx)^2 + (-1. + ky)^2, -0.23, 0.}, {0., 0., 0.,
0.12, -0.23,
0.12, -0.23, (1. + kx)^2 + (0. + ky)^2, -0.23}, {0., 0., 0.,
0., 0.12, -0.23, 0., -0.23, (1. + kx)^2 + (1. + ky)^2}}]][[
n]];
Plot3D[f[x, y, 4], {x, y} [Element] cell, PlotPoints -> 50]


enter image description here



and what the region should look like,



isovalue = 1.29897233417072;
ContourPlot[f[x, y, 4], {x, y} [Element] cell,
Contours -> {isovalue}, ColorFunction -> GrayLevel,
PlotPoints -> 100]


enter image description here



This is what I have tried



reg = ToElementMesh[
ImplicitRegion[
f[x, y, 4] < isovalue && {x, y} [Element] cell, {x, y}],
"MaxBoundaryCellMeasure" -> 0.01, MeshQualityGoal -> 1,
PerformanceGoal -> "Quality", MaxCellMeasure -> 0.01,
"BoundaryMeshGenerator" -> "Continuation"];
RegionPlot[reg]


enter image description here
The region is no more accurate when I decrease MaxCellMeasure or MaxBoundaryCellMeasure. I also tried the solution suggested here.










share|improve this question











$endgroup$

















    3












    $begingroup$


    I am trying to plot a function in a region below a level curve of the function and within a cell. I have been doing this by calculating an ElementMesh using ImplicitRegion and ToElementMesh, but the result has holes.



    Here is the cell (it's just a square),



    cell = Parallelogram[{-0.5`, -0.5`}, {{1.`, 0.`}, {0.`, 1.`}}];
    Graphics[{Transparent, EdgeForm[Thick], cell}]


    and the function,



    f[kx_, ky_, n_] := 
    Sort[Eigenvalues[{{(-1. + kx)^2 + (-1. + ky)^2, -0.23, 0., -0.23,
    0.12, 0., 0., 0.,
    0.}, {-0.23, (-1. + kx)^2 + (0. + ky)^2, -0.23, 0.12, -0.23,
    0.12, 0., 0., 0.}, {0., -0.23, (-1. + kx)^2 + (1. + ky)^2, 0.,
    0.12, -0.23, 0., 0., 0.}, {-0.23, 0.12,
    0., (0. + kx)^2 + (-1. + ky)^2, -0.23, 0., -0.23, 0.12,
    0.}, {0.12, -0.23,
    0.12, -0.23, (0. + kx)^2 + (0. + ky)^2, -0.23, 0.12, -0.23,
    0.12}, {0., 0.12, -0.23, 0., -0.23, (0. + kx)^2 + (1. + ky)^2,
    0., 0.12, -0.23}, {0., 0., 0., -0.23, 0.12,
    0., (1. + kx)^2 + (-1. + ky)^2, -0.23, 0.}, {0., 0., 0.,
    0.12, -0.23,
    0.12, -0.23, (1. + kx)^2 + (0. + ky)^2, -0.23}, {0., 0., 0.,
    0., 0.12, -0.23, 0., -0.23, (1. + kx)^2 + (1. + ky)^2}}]][[
    n]];
    Plot3D[f[x, y, 4], {x, y} [Element] cell, PlotPoints -> 50]


    enter image description here



    and what the region should look like,



    isovalue = 1.29897233417072;
    ContourPlot[f[x, y, 4], {x, y} [Element] cell,
    Contours -> {isovalue}, ColorFunction -> GrayLevel,
    PlotPoints -> 100]


    enter image description here



    This is what I have tried



    reg = ToElementMesh[
    ImplicitRegion[
    f[x, y, 4] < isovalue && {x, y} [Element] cell, {x, y}],
    "MaxBoundaryCellMeasure" -> 0.01, MeshQualityGoal -> 1,
    PerformanceGoal -> "Quality", MaxCellMeasure -> 0.01,
    "BoundaryMeshGenerator" -> "Continuation"];
    RegionPlot[reg]


    enter image description here
    The region is no more accurate when I decrease MaxCellMeasure or MaxBoundaryCellMeasure. I also tried the solution suggested here.










    share|improve this question











    $endgroup$















      3












      3








      3





      $begingroup$


      I am trying to plot a function in a region below a level curve of the function and within a cell. I have been doing this by calculating an ElementMesh using ImplicitRegion and ToElementMesh, but the result has holes.



      Here is the cell (it's just a square),



      cell = Parallelogram[{-0.5`, -0.5`}, {{1.`, 0.`}, {0.`, 1.`}}];
      Graphics[{Transparent, EdgeForm[Thick], cell}]


      and the function,



      f[kx_, ky_, n_] := 
      Sort[Eigenvalues[{{(-1. + kx)^2 + (-1. + ky)^2, -0.23, 0., -0.23,
      0.12, 0., 0., 0.,
      0.}, {-0.23, (-1. + kx)^2 + (0. + ky)^2, -0.23, 0.12, -0.23,
      0.12, 0., 0., 0.}, {0., -0.23, (-1. + kx)^2 + (1. + ky)^2, 0.,
      0.12, -0.23, 0., 0., 0.}, {-0.23, 0.12,
      0., (0. + kx)^2 + (-1. + ky)^2, -0.23, 0., -0.23, 0.12,
      0.}, {0.12, -0.23,
      0.12, -0.23, (0. + kx)^2 + (0. + ky)^2, -0.23, 0.12, -0.23,
      0.12}, {0., 0.12, -0.23, 0., -0.23, (0. + kx)^2 + (1. + ky)^2,
      0., 0.12, -0.23}, {0., 0., 0., -0.23, 0.12,
      0., (1. + kx)^2 + (-1. + ky)^2, -0.23, 0.}, {0., 0., 0.,
      0.12, -0.23,
      0.12, -0.23, (1. + kx)^2 + (0. + ky)^2, -0.23}, {0., 0., 0.,
      0., 0.12, -0.23, 0., -0.23, (1. + kx)^2 + (1. + ky)^2}}]][[
      n]];
      Plot3D[f[x, y, 4], {x, y} [Element] cell, PlotPoints -> 50]


      enter image description here



      and what the region should look like,



      isovalue = 1.29897233417072;
      ContourPlot[f[x, y, 4], {x, y} [Element] cell,
      Contours -> {isovalue}, ColorFunction -> GrayLevel,
      PlotPoints -> 100]


      enter image description here



      This is what I have tried



      reg = ToElementMesh[
      ImplicitRegion[
      f[x, y, 4] < isovalue && {x, y} [Element] cell, {x, y}],
      "MaxBoundaryCellMeasure" -> 0.01, MeshQualityGoal -> 1,
      PerformanceGoal -> "Quality", MaxCellMeasure -> 0.01,
      "BoundaryMeshGenerator" -> "Continuation"];
      RegionPlot[reg]


      enter image description here
      The region is no more accurate when I decrease MaxCellMeasure or MaxBoundaryCellMeasure. I also tried the solution suggested here.










      share|improve this question











      $endgroup$




      I am trying to plot a function in a region below a level curve of the function and within a cell. I have been doing this by calculating an ElementMesh using ImplicitRegion and ToElementMesh, but the result has holes.



      Here is the cell (it's just a square),



      cell = Parallelogram[{-0.5`, -0.5`}, {{1.`, 0.`}, {0.`, 1.`}}];
      Graphics[{Transparent, EdgeForm[Thick], cell}]


      and the function,



      f[kx_, ky_, n_] := 
      Sort[Eigenvalues[{{(-1. + kx)^2 + (-1. + ky)^2, -0.23, 0., -0.23,
      0.12, 0., 0., 0.,
      0.}, {-0.23, (-1. + kx)^2 + (0. + ky)^2, -0.23, 0.12, -0.23,
      0.12, 0., 0., 0.}, {0., -0.23, (-1. + kx)^2 + (1. + ky)^2, 0.,
      0.12, -0.23, 0., 0., 0.}, {-0.23, 0.12,
      0., (0. + kx)^2 + (-1. + ky)^2, -0.23, 0., -0.23, 0.12,
      0.}, {0.12, -0.23,
      0.12, -0.23, (0. + kx)^2 + (0. + ky)^2, -0.23, 0.12, -0.23,
      0.12}, {0., 0.12, -0.23, 0., -0.23, (0. + kx)^2 + (1. + ky)^2,
      0., 0.12, -0.23}, {0., 0., 0., -0.23, 0.12,
      0., (1. + kx)^2 + (-1. + ky)^2, -0.23, 0.}, {0., 0., 0.,
      0.12, -0.23,
      0.12, -0.23, (1. + kx)^2 + (0. + ky)^2, -0.23}, {0., 0., 0.,
      0., 0.12, -0.23, 0., -0.23, (1. + kx)^2 + (1. + ky)^2}}]][[
      n]];
      Plot3D[f[x, y, 4], {x, y} [Element] cell, PlotPoints -> 50]


      enter image description here



      and what the region should look like,



      isovalue = 1.29897233417072;
      ContourPlot[f[x, y, 4], {x, y} [Element] cell,
      Contours -> {isovalue}, ColorFunction -> GrayLevel,
      PlotPoints -> 100]


      enter image description here



      This is what I have tried



      reg = ToElementMesh[
      ImplicitRegion[
      f[x, y, 4] < isovalue && {x, y} [Element] cell, {x, y}],
      "MaxBoundaryCellMeasure" -> 0.01, MeshQualityGoal -> 1,
      PerformanceGoal -> "Quality", MaxCellMeasure -> 0.01,
      "BoundaryMeshGenerator" -> "Continuation"];
      RegionPlot[reg]


      enter image description here
      The region is no more accurate when I decrease MaxCellMeasure or MaxBoundaryCellMeasure. I also tried the solution suggested here.







      plotting finite-element-method mesh implicit






      share|improve this question















      share|improve this question













      share|improve this question




      share|improve this question








      edited 41 mins ago









      user21

      21.1k55999




      21.1k55999










      asked 8 hours ago









      jerjorgjerjorg

      874




      874






















          2 Answers
          2






          active

          oldest

          votes


















          3












          $begingroup$

          I hope I interpreted your question correctly that you want a more accurate ElementMesh representation of the region.



          First we create a high quality Graphics of the region of interest.



          isovalue = 1.29897233417072;
          (* Add some margins to plot range to get connected region. *)
          tolerance = 0.05;
          plot = ContourPlot[
          f[x, y, 4],
          {x, y} ∈ Cuboid[{-0.5, -0.5} - tolerance, {0.5, 0.5} + tolerance],
          Contours -> {isovalue},
          ColorFunction -> GrayLevel,
          (* We need high quality plot for ImageMesh later. *)
          PlotPoints -> 200,
          Frame -> None
          ]


          Create MeshRegion from Graphics object.



          mreg = ImageMesh[ColorNegate[plot]]


          And convert it to ElementMesh.



          Needs["NDSolve`FEM`"]
          mesh = ToElementMesh[mreg,"MeshOrder"->1]
          (* ElementMesh[{{7., 353.}, {7., 353.}}, {TriangleElement["<" 1057 ">"]}] *)

          mesh["Wireframe"]


          mesh






          share|improve this answer









          $endgroup$





















            3












            $begingroup$

            Another approach is:



            reg = ToElementMesh[
            ImplicitRegion[
            f[x, y, 4] < isovalue && {x, y} [Element] cell, {x, y}],
            "MaxBoundaryCellMeasure" -> 0.01, MeshQualityGoal -> 1,
            PerformanceGoal -> "Quality", MaxCellMeasure -> 0.01,
            "BoundaryMeshGenerator" -> {"RegionPlot", "SamplePoints" -> 41}];

            reg["Wireframe"]


            enter image description here



            One thing to be a bit careful about is the question if the holes intersect the boundary. From the mesh it does not look like it but the math might say it.






            share|improve this answer









            $endgroup$














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              2 Answers
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              2 Answers
              2






              active

              oldest

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              active

              oldest

              votes






              active

              oldest

              votes









              3












              $begingroup$

              I hope I interpreted your question correctly that you want a more accurate ElementMesh representation of the region.



              First we create a high quality Graphics of the region of interest.



              isovalue = 1.29897233417072;
              (* Add some margins to plot range to get connected region. *)
              tolerance = 0.05;
              plot = ContourPlot[
              f[x, y, 4],
              {x, y} ∈ Cuboid[{-0.5, -0.5} - tolerance, {0.5, 0.5} + tolerance],
              Contours -> {isovalue},
              ColorFunction -> GrayLevel,
              (* We need high quality plot for ImageMesh later. *)
              PlotPoints -> 200,
              Frame -> None
              ]


              Create MeshRegion from Graphics object.



              mreg = ImageMesh[ColorNegate[plot]]


              And convert it to ElementMesh.



              Needs["NDSolve`FEM`"]
              mesh = ToElementMesh[mreg,"MeshOrder"->1]
              (* ElementMesh[{{7., 353.}, {7., 353.}}, {TriangleElement["<" 1057 ">"]}] *)

              mesh["Wireframe"]


              mesh






              share|improve this answer









              $endgroup$


















                3












                $begingroup$

                I hope I interpreted your question correctly that you want a more accurate ElementMesh representation of the region.



                First we create a high quality Graphics of the region of interest.



                isovalue = 1.29897233417072;
                (* Add some margins to plot range to get connected region. *)
                tolerance = 0.05;
                plot = ContourPlot[
                f[x, y, 4],
                {x, y} ∈ Cuboid[{-0.5, -0.5} - tolerance, {0.5, 0.5} + tolerance],
                Contours -> {isovalue},
                ColorFunction -> GrayLevel,
                (* We need high quality plot for ImageMesh later. *)
                PlotPoints -> 200,
                Frame -> None
                ]


                Create MeshRegion from Graphics object.



                mreg = ImageMesh[ColorNegate[plot]]


                And convert it to ElementMesh.



                Needs["NDSolve`FEM`"]
                mesh = ToElementMesh[mreg,"MeshOrder"->1]
                (* ElementMesh[{{7., 353.}, {7., 353.}}, {TriangleElement["<" 1057 ">"]}] *)

                mesh["Wireframe"]


                mesh






                share|improve this answer









                $endgroup$
















                  3












                  3








                  3





                  $begingroup$

                  I hope I interpreted your question correctly that you want a more accurate ElementMesh representation of the region.



                  First we create a high quality Graphics of the region of interest.



                  isovalue = 1.29897233417072;
                  (* Add some margins to plot range to get connected region. *)
                  tolerance = 0.05;
                  plot = ContourPlot[
                  f[x, y, 4],
                  {x, y} ∈ Cuboid[{-0.5, -0.5} - tolerance, {0.5, 0.5} + tolerance],
                  Contours -> {isovalue},
                  ColorFunction -> GrayLevel,
                  (* We need high quality plot for ImageMesh later. *)
                  PlotPoints -> 200,
                  Frame -> None
                  ]


                  Create MeshRegion from Graphics object.



                  mreg = ImageMesh[ColorNegate[plot]]


                  And convert it to ElementMesh.



                  Needs["NDSolve`FEM`"]
                  mesh = ToElementMesh[mreg,"MeshOrder"->1]
                  (* ElementMesh[{{7., 353.}, {7., 353.}}, {TriangleElement["<" 1057 ">"]}] *)

                  mesh["Wireframe"]


                  mesh






                  share|improve this answer









                  $endgroup$



                  I hope I interpreted your question correctly that you want a more accurate ElementMesh representation of the region.



                  First we create a high quality Graphics of the region of interest.



                  isovalue = 1.29897233417072;
                  (* Add some margins to plot range to get connected region. *)
                  tolerance = 0.05;
                  plot = ContourPlot[
                  f[x, y, 4],
                  {x, y} ∈ Cuboid[{-0.5, -0.5} - tolerance, {0.5, 0.5} + tolerance],
                  Contours -> {isovalue},
                  ColorFunction -> GrayLevel,
                  (* We need high quality plot for ImageMesh later. *)
                  PlotPoints -> 200,
                  Frame -> None
                  ]


                  Create MeshRegion from Graphics object.



                  mreg = ImageMesh[ColorNegate[plot]]


                  And convert it to ElementMesh.



                  Needs["NDSolve`FEM`"]
                  mesh = ToElementMesh[mreg,"MeshOrder"->1]
                  (* ElementMesh[{{7., 353.}, {7., 353.}}, {TriangleElement["<" 1057 ">"]}] *)

                  mesh["Wireframe"]


                  mesh







                  share|improve this answer












                  share|improve this answer



                  share|improve this answer










                  answered 1 hour ago









                  PintiPinti

                  3,95211037




                  3,95211037























                      3












                      $begingroup$

                      Another approach is:



                      reg = ToElementMesh[
                      ImplicitRegion[
                      f[x, y, 4] < isovalue && {x, y} [Element] cell, {x, y}],
                      "MaxBoundaryCellMeasure" -> 0.01, MeshQualityGoal -> 1,
                      PerformanceGoal -> "Quality", MaxCellMeasure -> 0.01,
                      "BoundaryMeshGenerator" -> {"RegionPlot", "SamplePoints" -> 41}];

                      reg["Wireframe"]


                      enter image description here



                      One thing to be a bit careful about is the question if the holes intersect the boundary. From the mesh it does not look like it but the math might say it.






                      share|improve this answer









                      $endgroup$


















                        3












                        $begingroup$

                        Another approach is:



                        reg = ToElementMesh[
                        ImplicitRegion[
                        f[x, y, 4] < isovalue && {x, y} [Element] cell, {x, y}],
                        "MaxBoundaryCellMeasure" -> 0.01, MeshQualityGoal -> 1,
                        PerformanceGoal -> "Quality", MaxCellMeasure -> 0.01,
                        "BoundaryMeshGenerator" -> {"RegionPlot", "SamplePoints" -> 41}];

                        reg["Wireframe"]


                        enter image description here



                        One thing to be a bit careful about is the question if the holes intersect the boundary. From the mesh it does not look like it but the math might say it.






                        share|improve this answer









                        $endgroup$
















                          3












                          3








                          3





                          $begingroup$

                          Another approach is:



                          reg = ToElementMesh[
                          ImplicitRegion[
                          f[x, y, 4] < isovalue && {x, y} [Element] cell, {x, y}],
                          "MaxBoundaryCellMeasure" -> 0.01, MeshQualityGoal -> 1,
                          PerformanceGoal -> "Quality", MaxCellMeasure -> 0.01,
                          "BoundaryMeshGenerator" -> {"RegionPlot", "SamplePoints" -> 41}];

                          reg["Wireframe"]


                          enter image description here



                          One thing to be a bit careful about is the question if the holes intersect the boundary. From the mesh it does not look like it but the math might say it.






                          share|improve this answer









                          $endgroup$



                          Another approach is:



                          reg = ToElementMesh[
                          ImplicitRegion[
                          f[x, y, 4] < isovalue && {x, y} [Element] cell, {x, y}],
                          "MaxBoundaryCellMeasure" -> 0.01, MeshQualityGoal -> 1,
                          PerformanceGoal -> "Quality", MaxCellMeasure -> 0.01,
                          "BoundaryMeshGenerator" -> {"RegionPlot", "SamplePoints" -> 41}];

                          reg["Wireframe"]


                          enter image description here



                          One thing to be a bit careful about is the question if the holes intersect the boundary. From the mesh it does not look like it but the math might say it.







                          share|improve this answer












                          share|improve this answer



                          share|improve this answer










                          answered 27 mins ago









                          user21user21

                          21.1k55999




                          21.1k55999






























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