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semi-implicit method

A finite difference approximation in which some terms producing time change are specified at an earlier time level. The approximation (fn + 1 − fn − 1)/2Δt = g(fn + 1) + h(fn) (where superscript n denotes a point in time, separated by step Δt from the prior (n − 1) and subsequent (n + 1) discrete time level) is an example of a semi-implicit approximation to df/dt = g(f) + h(f). Semi-implicit approximations may increase computational efficiency when g produces relatively higher frequencies or more rapid time changes in f than does h. See implicit time difference.

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  • Kevin Bowles
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