Title of article
Doubly quasi-consistent parallel explicit peer methods with built-in global error estimation
Author/Authors
Kulikov، نويسنده , , G.Yu. and Weiner، نويسنده , , R.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
14
From page
2351
To page
2364
Abstract
Recently, Kulikov presented the idea of double quasi-consistency, which facilitates global error estimation and control, considerably. More precisely, a local error control implemented in such methods plays a part of global error control at the same time. However, Kulikov studied only Nordsieck formulas and proved that there exists no doubly quasi-consistent scheme among those methods.
we prove that the class of doubly quasi-consistent formulas is not empty and present the first example of such sort. This scheme belongs to the family of superconvergent explicit two-step peer methods constructed by Weiner, Schmitt, Podhaisky and Jebens. We present a sample of s -stage doubly quasi-consistent parallel explicit peer methods of order s − 1 when s = 3 . The notion of embedded formulas is utilized to evaluate efficiently the local error of the constructed doubly quasi-consistent peer method and, hence, its global error at the same time. Numerical examples of this paper confirm clearly that the usual local error control implemented in doubly quasi-consistent numerical integration techniques is capable of producing numerical solutions for user-supplied accuracy conditions in automatic mode.
Keywords
Superconvergent explicit two-step peer methods , Doubly quasi-consistent numerical schemes , Embedded formulas , adaptivity , Local error estimation , Automatic global error control
Journal title
Journal of Computational and Applied Mathematics
Serial Year
2010
Journal title
Journal of Computational and Applied Mathematics
Record number
1555528
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