Showing total 2 results

1. Local and global error estimation in Nordsieck methods.

Author

KULIKOV, G. Yu. and SHINDIN, S. K.

Subjects

*ERROR analysis in mathematics, *NUMERICAL analysis, *DIFFERENTIAL equations, *MULTISTEP direct reactions (Nuclear physics), *EQUATIONS

Abstract

This paper deals with asymptotically correct methods to evaluate the local and global errors of Nordsieck formulas applied to ordinary differential equations. It extends naturally the results developed by Kulikov and Shindin [ Comp. Math. Math. Phys. (2000) 40, 1255–1275] in local and global error computation of multistep methods, but shows that Kulikov and Shindin's technique becomes more complicated when implemented in numerical methods, for which the concepts of consistency and quasi-consistency are not equivalent (see Skeel [ SIAM J. Numer. Anal. (1976) 13, 664–685]). A new property termed super quasi-consistency is introduced and special cases of Nordsieck formulas with cheaper error estimation are found. Numerical examples are included to confirm practically the theory presented in this paper. [ABSTRACT FROM AUTHOR]

Published

2008

2. Automatic error control in the Gauss-type nested implicit Runge–Kutta formula of order 6.

Author

KULIKOV, G. Yu.

Subjects

*ERROR analysis in mathematics, *NUMERICAL analysis, *ERROR functions, *EQUATIONS, *DIFFERENTIAL equations, *PARTIAL differential equations

Abstract

Five different error estimation strategies suitable for the Gauss-type Nested Implicit Runge–Kutta method of order 4 have been presented and tested numerically in [Kulikov and Shindin, Lecture Notes in Computer Science: 136–143, 2007, Kulikov and Shindin, Appl. Numer. Math. 59: 707–722, 2009]. The nested Implicit Runge–Kutta schemes introduced recently are an efficient class of Implicit Runge–Kutta formulas. In this paper we deal with the methods of order 6. One scheme of such sort has been constructed in [Kulikov and Shindin, Appl. Numer. Math. 59: 707–722, 2009]. Now we present a one-parametric family of the above-mentioned formulas of order 6 by relaxing the accuracy requirement for some stage values. This allows the error estimation strategies designed for the method of order 4 to be extended to the higher-order Gauss-type Nested Implicit Runge–Kutta method. We also present the particulars of the efficient implementation of this method, which is stable and accurate. The numerical examples confirm the efficiency of the numerical scheme under consideration for both ordinary differential equations and partial differential equations. [ABSTRACT FROM AUTHOR]

Published

2009