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JSCIC
2016
2016
A Linearly Fourth Order Multirate Runge-Kutta Method with Error Control
Abstract To integrate large systems of locally coupled ordinary differential equations (ODEs) with disparate timescales, we present a multirate method with error control that is based on the Cash-Karp Runge-Kutta (RK) formula. The order of multirate methods often depends on interpolating certain solution components with a polynomial of sufficiently high degree. By using cubic interpolants and analyzing the method applied to a simple test equation, we show that our method is fourth order linearly accurate overall. Furthermore, the size of the region of absolute stability is increased when taking many “micro-steps” within a “macro-step.” Finally, we demonstrate our method on three simple test problems to confirm fourth order convergence. Keywords Multirate · Runge-Kutta · Interpolation
Real-time Traffic| Added | 07 Apr 2016 |
| Updated | 07 Apr 2016 |
| Type | Journal |
| Year | 2016 |
| Where | JSCIC |
| Authors | Pak-Wing Fok |
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