Heat conduction

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:[[Discretization]] of computational domain and governing equations, one-dimensional [[steady]] and [[unsteady]] state conduction, [[multi-dimensional unsteady-state conduction]], and [[solution of algebraic equations]]
:[[Discretization]] of computational domain and governing equations, one-dimensional [[steady]] and [[unsteady]] state conduction, [[multi-dimensional unsteady-state conduction]], and [[solution of algebraic equations]]
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*<b>Melting and Solidification</b>
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*<b>[[Melting and Solidification]]</b>
:[[Classification]], [[boundary conditions at interface]], [[exact solution]],and [[numerical solution]].
:[[Classification]], [[boundary conditions at interface]], [[exact solution]],and [[numerical solution]].

Revision as of 15:30, 18 April 2009

Conduction is heat transfer across a stationary medium, either solid or fluid. For an electrically nonconducting solid, conduction is attributed to atomic activity in the form of lattice vibration, while the mechanism of conduction in an electrically-conducting solid is a combination of lattice vibration and translational motion of electrons. Heat conduction in a liquid or gas is due to the random motion and interaction of the molecules. For most engineering problems, it is impractical and unnecessary to track the motion of individual molecules and electrons, which may instead be described using the macroscopic averaged temperature.

Mechanism of heat conduction, Fourier's law and thermal conductivity.
Finite slabs, cylindrical and spherical walls, extended surface, bioheat equation, two-dimensional conduction, conduction from burried object
Lumped analysis, finite slabs, cylinders, spheres, semi-infinite body, and multi-dimensional conduction.
  • Numerical Solution of Heat Conduction
Discretization of computational domain and governing equations, one-dimensional steady and unsteady state conduction, multi-dimensional unsteady-state conduction, and solution of algebraic equations
Classification, boundary conditions at interface, exact solution,and numerical solution.
Hyperbolic model, Dual-Phase Lag (DPL) model, and Two-temperature models.