Discussion Closed This discussion was created more than 6 months ago and has been closed. To start a new discussion with a link back to this one, click here.
Nonlinear diffusion equation – Weak form PDE
Posted 2015年4月22日 GMT-4 16:05 Chemical Reaction Engineering, Modeling Tools & Definitions Version 5.1 1 Reply
Please login with a confirmed email address before reporting spam
Dear COMSOL users,
Consider a thin film in the xy plane with an applied magnetic field Ha (A/m) in the z-axis. By increasing Ha, the equation for the time evolution of the local magnetization m (A/m) is :
mt = 2 F^(-1) [ k^-1*F*( div( |grad m|*grad m ) – Hat )]
Where F^(-1) and F are Fourier and inverse Fourier transforms, respectively, and k is the wave vector.
The calculation of the temporal evolution of the local magnetization is based on discrete integration forward in time : mt = (prev(m,1)-m)/timestep, which can be solved by the time discrete solver.
My question is : how can I implement Hat ?
Many thanks in advance for any feedback !
Regards,
Obaid
Consider a thin film in the xy plane with an applied magnetic field Ha (A/m) in the z-axis. By increasing Ha, the equation for the time evolution of the local magnetization m (A/m) is :
mt = 2 F^(-1) [ k^-1*F*( div( |grad m|*grad m ) – Hat )]
Where F^(-1) and F are Fourier and inverse Fourier transforms, respectively, and k is the wave vector.
The calculation of the temporal evolution of the local magnetization is based on discrete integration forward in time : mt = (prev(m,1)-m)/timestep, which can be solved by the time discrete solver.
My question is : how can I implement Hat ?
Many thanks in advance for any feedback !
Regards,
Obaid
1 Reply Last Post 2015年4月23日 GMT-4 16:52