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Gear predictor-corrector integration

The integral time interval is about 1 fs and the equation of motion is integrated by fifth-order Gear predictor-corrector method [8]. [Pg.1357]

The state trajectory u t) is computed by the implicit integrator DDASSL (Petzold 1982 Brenan, Campbell, and Petzold 1989). updated here to handle the initial condition of Eq. (B.1-2). The DDASSL integrator is especially designed to handle stiff, coupled systems of ordinary differential and algebraic equations. It employs a variable-order, variable-step predictor-corrector approach initiated by Gear (1971). The derivative vector applicable at t +i. is approximated in the corrector stage by a... [Pg.190]

See other pages where Gear predictor-corrector integration is mentioned: [Pg.375]    [Pg.375]    [Pg.266]    [Pg.61]    [Pg.371]    [Pg.86]    [Pg.73]    [Pg.78]    [Pg.72]    [Pg.371]    [Pg.226]    [Pg.320]    [Pg.4801]    [Pg.301]    [Pg.1358]    [Pg.61]    [Pg.285]    [Pg.657]    [Pg.87]    [Pg.314]    [Pg.212]    [Pg.112]    [Pg.391]    [Pg.358]    [Pg.2842]    [Pg.95]   


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Corrector

Gear predictor-corrector

Gear predictor-corrector integration method

Gear, gearing

Gears

Integral gearing

Integrally geared

Predictor-corrector

Predictors

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