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Meshing of multilayered Hemispherical 3-D geometry and Time dependant heat flux at the boundary
Posted 3 dic 2012, 06:38 GMT-5 Heat Transfer & Phase Change 1 Reply
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Hello Sir,
I am trying to simulate a 3D tissue model, which is hemispherical in shape. I am imposing a sinusoidal heat flux on the top curved surface of hemisphere. After solving the transient bio heat equation, I am converting the same in ‘avi’ format for further image processing in MATLAB. But, the problem is that the image frames at each time step appears in patches on the surface (spatial contrast) of irradiated boundary. It is not continuous over the surface of irradiation in case of curved face case when compared to flat face case. I am attaching the images of first few time steps. I am not sure whether the patches are because of meshing or because the heat flux is not uniformly distributed over the curved surface. I am attaching the images of the simulation for your understanding. I will be grateful for your kind advice.
Thanking You
Arka Bhowmik
I am trying to simulate a 3D tissue model, which is hemispherical in shape. I am imposing a sinusoidal heat flux on the top curved surface of hemisphere. After solving the transient bio heat equation, I am converting the same in ‘avi’ format for further image processing in MATLAB. But, the problem is that the image frames at each time step appears in patches on the surface (spatial contrast) of irradiated boundary. It is not continuous over the surface of irradiation in case of curved face case when compared to flat face case. I am attaching the images of first few time steps. I am not sure whether the patches are because of meshing or because the heat flux is not uniformly distributed over the curved surface. I am attaching the images of the simulation for your understanding. I will be grateful for your kind advice.
Thanking You
Arka Bhowmik
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1 Reply Last Post 3 dic 2012, 07:08 GMT-5
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Posted:
1 decade ago
Hi,
what is the amplitude of those spatial variations relative to the average value?
Cheers
Edgar
what is the amplitude of those spatial variations relative to the average value?
Cheers
Edgar