Thermal Analysis Equations

The heat transfer equation is a parabolic partial differential equation that describes the distribution of temperature in a particular region over given time:

$ρ c \frac{\partial T}{\partial t} - \nabla \cdot (k \nabla T) = Q$

Parameters of the heat transfer equation are as follows:

ρ is the density of the material.
c is the specific heat of the material.
k is the thermal conductivity of the material.
Q is the heat source.

Boundary conditions include temperatures on the boundaries or heat fluxes through the boundaries.

For convective heat flux through the boundary $h t c (T - T_{\infty})$ , specify the ambient temperature $T_{\infty}$ and the convective heat transfer coefficient htc.
For radiative heat flux $ε σ (T^{4} - T_{\infty}^{4})$ , specify the ambient temperature $T_{\infty}$ , emissivity ε, and Stefan-Boltzmann constant σ.

By default, the toolbox uses the zero Neumann boundary condition and assumes that the boundary is insulated, so heat flux through the boundary is 0.

Thermal Analysis Equations

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