Alternating direction implicit (ADI) method
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== Concept == | == Concept == | ||
| - | A common method of solving an elliptic problem is to add a term containing first derivative of time to the equation and solve the resulting parabolic equation until a steady state is reached. At this stage, the time derivative is zero and the solution represents the original problem. | + | A common method of solving an [[elliptic problem]] is to add a term containing [[first derivative]] of time to the equation and solve the resulting [[parabolic equation]] until a [[steady state]] is reached. At this stage, the [[time derivative]] is zero and the solution represents the original problem. |
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<i> Return to [[Numerical methods | Numerical Methods]] </i> | <i> Return to [[Numerical methods | Numerical Methods]] </i> | ||
Latest revision as of 19:49, 14 August 2007
Concept
A common method of solving an elliptic problem is to add a term containing first derivative of time to the equation and solve the resulting parabolic equation until a steady state is reached. At this stage, the time derivative is zero and the solution represents the original problem.
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