"A Three-Stage Multiderivative Explicit Runge-Kutta Method"
written by Ashiribo Senapon Wusu, Moses Adebowale Akanbi, Solomon Adebola Okunuga,
published by American Journal of Computational Mathematics, Vol.3 No.2, 2013
has been cited by the following article(s):
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[1] Computational Techniques Based on Runge-Kutta Method of Various Order and Type for Solving Differential Equations
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[2] Solution of an Initial Value Problemin Ordinary Differential Equations Using the Quadrature Algorithm Based on the Heronian Mean
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[3] On explicit two-derivative two-step Runge–Kutta methods
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[4] A New Third Order Iterative Integrator for Cauchy Problems
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[5] Exponentially-fitted Fourth-Order Taylor's Algorithm for Solving First-Order ODEs
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[6] A New 4 th Order Hybrid Runge-Kutta Methods for Solving Initial Value Problems (IVPs)
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[7] Development of a nonlinear hybrid numerical method
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[8] Trio-Geometric mean-based three-stage Runge–Kutta algorithm to solve initial value problem arising in autonomous systems
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[9] Exponentially-Fitted 2-Step Simpson's Method for Oscillatory/Periodic Problems
Journal of Applied Mathematics and Physics, 2016
[10] Derivation of three-derivative Runge-Kutta methods
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[11] On the Derivation and Implementation of a Four Stage Harmonic Explicit Runge-Kutta Method
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[12] On the Derivation and Implementation of a Four Stage Harmonic Explicit Runge-Kutta Method*
Applied Mathematics, 2015
[13] A NOTE ON EXPLICIT THREE-DERIVATIVE RUNGE-KUTTA METHODS (ThDRK)
2015
[14] Compact Extrapolation Schemes for a Linear Schr?dinger Equation
American Journal of Computational Mathematics, 2014