The paper, discusses semi-implicit inverse Runge –Kutta Scheme for numerical solution of stiff ordinary differential equation of the form y'=f(x,y), a≤x≤b. Its derivation adopts Taylor and binomial series expansion , while it analysis of its stability uses the well known A-stability test model equation. Both theoretical and experimental results show that the scheme is A-stable. Numerical results compared favourably with existing Euler’s method
This paper gives new insight into the concept of D-stability of Runge-Kutta methods for stiff ordina...
This paper describes the Development, Analysis and Implementation of Three-Stage Inverse Implicit Ru...
A family of Time-Accurate and Stable Explicit (TASE) methods for the numerical integration of Initia...
In this paper, a new class of A-Stable Implicit Rational Runge-Kutta schemes were developed, analyze...
In this paper, a new class of A-Stable Implicit Rational Runge-Kutta schemes were developed, analyze...
In this article, we extended the existing explicit Taylor method and modified it to gain a new expli...
The goal of this work is to develop, analyse and implement a K-step Implicit Rational Runge-Kutta sc...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
Abstract: This study is concerned with a new class of Runge-Kutta –type methods for s...
While purely numerical methods for solving ordinary differential equations (ODE), e.g., Runge–Kutta ...
Implicit Runge–Kutta methods are successful algorithms for the numerical solu-tion of stiff differen...
This paper gives new insight into the concept of D-stability of Runge-Kutta methods for stiff ordina...
This paper describes the Development, Analysis and Implementation of Three-Stage Inverse Implicit Ru...
A family of Time-Accurate and Stable Explicit (TASE) methods for the numerical integration of Initia...
In this paper, a new class of A-Stable Implicit Rational Runge-Kutta schemes were developed, analyze...
In this paper, a new class of A-Stable Implicit Rational Runge-Kutta schemes were developed, analyze...
In this article, we extended the existing explicit Taylor method and modified it to gain a new expli...
The goal of this work is to develop, analyse and implement a K-step Implicit Rational Runge-Kutta sc...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
The aim of this talk is to show techniques that allow to modify the coefficients of classic explicit...
Abstract: This study is concerned with a new class of Runge-Kutta –type methods for s...
While purely numerical methods for solving ordinary differential equations (ODE), e.g., Runge–Kutta ...
Implicit Runge–Kutta methods are successful algorithms for the numerical solu-tion of stiff differen...
This paper gives new insight into the concept of D-stability of Runge-Kutta methods for stiff ordina...
This paper describes the Development, Analysis and Implementation of Three-Stage Inverse Implicit Ru...
A family of Time-Accurate and Stable Explicit (TASE) methods for the numerical integration of Initia...
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