6533b822fe1ef96bd127cd5f
RESEARCH PRODUCT
Efficient High-Order Iterative Methods for Solving Nonlinear Systems and Their Application on Heat Conduction Problems
Alicia CorderoEsther GómezJuan R. Torregrosasubject
MultidisciplinaryArticle SubjectGeneral Computer ScienceIterative methodMathematical analysisFinite differenceRelaxation (iterative method)010103 numerical & computational mathematics02 engineering and technologyThermal conduction01 natural sciencesExpression (mathematics)lcsh:QA75.5-76.95Local convergenceNonlinear system0202 electrical engineering electronic engineering information engineering020201 artificial intelligence & image processingHeat equationlcsh:Electronic computers. Computer science0101 mathematicsMATEMATICA APLICADAMathematicsdescription
[EN] For solving nonlinear systems of big size, such as those obtained by applying finite differences for approximating the solution of diffusion problem and heat conduction equations, three-step iterative methods with eighth-order local convergence are presented. The computational efficiency of the new methods is compared with those of some known ones, obtaining good conclusions, due to the particular structure of the iterative expression of the proposed methods. Numerical comparisons are made with the same existing methods, on standard nonlinear systems and a nonlinear one-dimensional heat conduction equation by transforming it in a nonlinear system by using finite differences. From these numerical examples, we confirm the theoretical results and show the performance of the presented schemes.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2017-01-01 | Complexity |