Stacked Cuboid for PDE Domain

11 visualizaciones (últimos 30 días)
Paul Safier
Paul Safier el 7 de Feb. de 2024
Comentada: Paul Safier el 13 de Feb. de 2024
Can the following domain be created for use in the PDE Toolbox? It does not seem that ordinary operations with the multicuboid function can stack cuboids with different width and heights, but is there another way?
Thanks!

Respuesta aceptada

Ravi Kumar
Ravi Kumar el 9 de Feb. de 2024
Editada: Ravi Kumar el 10 de Feb. de 2024
Here is an example, use this code and modify the dimensions.
% Define the first square of size 1
x1 = [0; 1; 1; 0]; % x-coordinates
y1 = [0; 0; 1; 1]; % y-coordinates
% Define the second square of size 0.5
x2 = [0.25; 0.75; 0.75; 0.25]; % x-coordinates
y2 = [0.25; 0.25; 0.75; 0.75]; % y-coordinates
% Concatenate coordinates for decsg input
rect1 = [3; 4; x1; y1]; % First square definition
rect2 = [3; 4; x2; y2]; % Second square definition
% Create geometry matrix for decsg
gdm = [rect1, rect2]; % Geometry description matrix
ns = char('R1', 'R2'); % Name space matrix
sf = 'R1+R2'; % Set formula
ns = ns';
% Create the 2-D geometry using decsg
gd = decsg(gdm, sf, ns);
% Create a fegeometry
gm = fegeometry(gd);
% Now, extrude the 2-D geometry to a 3-D geometry with a length of 1
gm = extrude(gm, 1);
% Merge the cells in the 3-D geometry
cellIDsToMerge = [1, 2];
gm = mergeCells(gm, cellIDsToMerge);
% Find the smaller of the two faces at the top
% We use a point above the center of the smaller square along the z-axis
topSmallerSquareCenterPoint = [0.5, 0.5, 1]; % Row vector for coordinates
topSmallerFaceID = nearestFace(gm, topSmallerSquareCenterPoint);
% Extrude the smaller top face by a length of 1
gm = extrude(gm, topSmallerFaceID, 1);
% Rotate the complete geometry by 180 degrees around the x-axis
% to place the new smaller cube at the bottom
axisOfRotation = [1, 0, 0]; % Rotation axis (x-axis)
pointOnAxis = [0, 0, 0]; % A point on the axis of rotation (origin)
angleOfRotation = 180; % Rotation angle in radians (180 degrees)
gm = rotate(gm, angleOfRotation, axisOfRotation, pointOnAxis);
% Now the complete geometry is rotated, and the smaller cube is at the bottom
pdegplot(gm)
  5 comentarios
Torsten
Torsten el 10 de Feb. de 2024
In old FLUENT/Gambit, you can just define the two volumes by the 8 corner points. Then there is a command "split" that splits the big face by the small face where the two volumes meet. That's all. After this, you can mesh both volumes separately.
Ravi Kumar
Ravi Kumar el 13 de Feb. de 2024
Thanks for sharing that approach!

Iniciar sesión para comentar.

Más respuestas (2)

Torsten
Torsten el 8 de Feb. de 2024
Editada: Torsten el 8 de Feb. de 2024
Usually in such cases the domain is divided into subcubes that share common faces.
E.g. the upper cube could be divided into 9 obvious subcubes: 3 in the left part, 3 in the middle and 3 in the right part.
  2 comentarios
Paul Safier
Paul Safier el 8 de Feb. de 2024
Editada: Paul Safier el 8 de Feb. de 2024
Hi @Torsten. Thanks for the idea. I have not found any info or example of how to subdivide a cube. I did attempt to add vertices in hopes that I could ultimately use the addFace function, but that needs edges to be defined and there is no addEdges function.
I also attempted to define the domain in 2D and then extrude to 3D, but that is failing because I need some separation to define the bottom cube.
Do you have an example of what you suggest? Thanks.
Torsten
Torsten el 8 de Feb. de 2024
Editada: Torsten el 8 de Feb. de 2024
I don't know about the capabilities of the geometry builder of the PDE Toolbox.
Is it not possible to create two cuboids that share a common face and unite them ?
But looking at the examples, it seems best to create the geometry in an external CAD program and then import it in MATLAB.

Iniciar sesión para comentar.


Ravi Kumar
Ravi Kumar el 13 de Feb. de 2024
Our geometry expert provided a much compact version to create this geometry:
g=fegeometry(multicuboid([1 2],[1 2],2))
g2=extrude(g,2,1)
g3=mergeCells(g2,[1 2])
pdegplot(g3,FaceAlpha=0.8,CellLabels="on")

Productos


Versión

R2023b

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by