论文信息 - An Improvement to the Computing of Nonlinear Equation Solutions

An Improvement to the Computing of Nonlinear Equation Solutions

In this paper, we suggest an improvement to the iterative methods based on the inverse interpolation polynomial, also referred to as the generalized Hermite interpolation, which increases the local order of convergence. A symbolic computation allows us to find the best coefficients with regard to the order of convergence. The adaptation of the strategy presented here gives a new iteration function with a new evaluation of the function. It also shows a smaller cost if we use adaptive multi-precision arithmetic. The numerical results computed using this system, with a floating point system representing 200 and 1000 decimal digits support this theory.

Miquel Grau

[1] David H. Bailey,et al. Algorithm 719: Multiprecision translation and execution of FORTRAN programs , 1993, TOMS.

[2] Miquel Grau-Sánchez,et al. A variant of Cauchy's method with accelerated fifth-order convergence , 2004, Appl. Math. Lett..

[3] David H. Bailey,et al. Multiprecision Translation and Execution of Fortran Programs , 1993 .

[4] Maria Italia Gualtieri,et al. A New Iterative Method for the Computation of the Solutions of Nonlinear Equations , 2001, Numerical Algorithms.

[5] Florian A. Potra,et al. Some efficient methods for enclosing simple zeros of nonlinear equations , 1992 .

[6] Francis J. Wright. Computing with Maple , 2001 .

[7] J. Traub. Iterative Methods for the Solution of Equations , 1982 .

[8] J. Stoer,et al. Introduction to Numerical Analysis , 2002 .

[9] Frank G. Garvan,et al. The MAPLE Book , 2001 .

[10] Samuel D. Conte,et al. Elementary Numerical Analysis , 1980 .