Stabilized methods (also called Chebyshev methods) are explicit Runge-Kutta methods with extended stability domains along the negative real axis. These methods are intended for large mildly stiff problems, originating mainly from parabolic PDEs. The aim of this paper is to show that with the use of orthogonal polynomials, we can construct nearly optimal stability polynomials of second order with a three-term recurrence relation. These polynomials can be used to construct a new numerical method, which is implemented in a code called ROCK2. This new numerical method can be seen as a combination of van der Houwen-Sommeijer-type methods and Lebedev-type methods
The convergence of new second-order iterative methods are analyzed in Banach spaces by introducing a...
In recent years some attention has been devoted to two-step Runge-Kutta methods (TSRK), in order to ...
We construct and analyse explicit methods for solving initial value problems for systems of differen...
In this paper, a new family of fourth order Chebyshev methods (also called stabilized methods) is co...
Paper presented at the 5th Strathmore International Mathematics Conference (SIMC 2019), 12 - 16 Augu...
The analytic form of a new class of factorized Runge-Kutta-Chebyshev (FRKC) stability polynomials of...
AbstractMethods proposed by Panovsky and Richardson (this journal, 1988) are interpreted as a family...
Chebyshev polynomials crop up in virtually every area of numerical analysis, and they hold particula...
We consider the numerical solution of second order ordinary differential equations (ODEs) by General ...
Two applications of the modified Chebyshev algorithm are considered. The first application deals wit...
We propose hybrid Chebyshev polynomial scheme (HCPS), which couples the Chebyshev polynomial scheme ...
We investigate algebraic stability of two-step Runge-Kutta (TSRK) methods and of the new class of tw...
We describe the search for A-stable and algebraically stable two-step Runge Kutta methods of order p...
AbstractIn this article an efficient modification of the homotopy perturbation method is presented b...
Stabilized Runge???Kutta methods are especially efficient for the numerical solution of large system...
The convergence of new second-order iterative methods are analyzed in Banach spaces by introducing a...
In recent years some attention has been devoted to two-step Runge-Kutta methods (TSRK), in order to ...
We construct and analyse explicit methods for solving initial value problems for systems of differen...
In this paper, a new family of fourth order Chebyshev methods (also called stabilized methods) is co...
Paper presented at the 5th Strathmore International Mathematics Conference (SIMC 2019), 12 - 16 Augu...
The analytic form of a new class of factorized Runge-Kutta-Chebyshev (FRKC) stability polynomials of...
AbstractMethods proposed by Panovsky and Richardson (this journal, 1988) are interpreted as a family...
Chebyshev polynomials crop up in virtually every area of numerical analysis, and they hold particula...
We consider the numerical solution of second order ordinary differential equations (ODEs) by General ...
Two applications of the modified Chebyshev algorithm are considered. The first application deals wit...
We propose hybrid Chebyshev polynomial scheme (HCPS), which couples the Chebyshev polynomial scheme ...
We investigate algebraic stability of two-step Runge-Kutta (TSRK) methods and of the new class of tw...
We describe the search for A-stable and algebraically stable two-step Runge Kutta methods of order p...
AbstractIn this article an efficient modification of the homotopy perturbation method is presented b...
Stabilized Runge???Kutta methods are especially efficient for the numerical solution of large system...
The convergence of new second-order iterative methods are analyzed in Banach spaces by introducing a...
In recent years some attention has been devoted to two-step Runge-Kutta methods (TSRK), in order to ...
We construct and analyse explicit methods for solving initial value problems for systems of differen...