Steady State Heat in 2D

This is the simulation of the heating of rectangular piece of material. We set a cosine and a sine as boundary conditions. This is an elliptic equation, so the solution is smoother than the boundary data, as you can see in the applet. The maximim and minimum values are reached in the boundaries.

Theory pages:
Main page	FEM (i)	FEM (ii)	FDM (i)

Example pages:
1-d Heat Equation	2-d steady state Heat Equation
2-d Heat Equation	1-d non diffusive transport equation
1-d diffusive transport equation	2-d Non diffusive transport equation
Mesh generation with OOCSMP	Moving grids

Application pages:
Heating of two beams	Heating of two moving beams
Solving the equation U_t+U_xx+U_xy+U_yx=0	Solving the equation U_t+U_xx+U_xy+U_yx=0 using MGEN
Heat 1d using several outputs	Solving the Heat equation with a CA
Comparing a CA with the FEM	Gordon's sine equation

Other courses
Gravitation	Ecology	Electronics	PDEs	Other pages

Last modified 22/12/99 by Juan de Lara ( Juan.Lara@ii.uam.es, http://www.ii.uam.es/~jlara) need help for using this courses?.

The OOCSMP code - The SODA code