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A class of explicit second derivative general linear methods for non-stiff ODEs

    Mohammad Sharifi Affiliation
    ; Ali Abdi   Affiliation
    ; Michal Braś Affiliation
    ; Gholamreza Hojjati Affiliation

Abstract

In this paper, we construct explicit second derivative general linear methods (SGLMs) with quadratic stability and a large region of absolute stability for the numerical solution of non-stiff ODEs. The methods are constructed in two different cases: SGLMs with p = q = r = s and SGLMs with p = q and r = s = 2 in which p, q, r and s are respectively the order, stage order, the number of external stages and the number of internal stages. Examples of the methods up to order five are given. The efficiency of the constructed methods is illustrated by applying them to some well-known non-stiff problems and comparing the obtained results with those of general linear methods of the same order and stage order.

Keyword : non-stiff ODEs, general linear methods, second derivative methods, order conditions, quadratic stability

How to Cite
Sharifi, M., Abdi, A., Braś, M., & Hojjati, G. (2024). A class of explicit second derivative general linear methods for non-stiff ODEs. Mathematical Modelling and Analysis, 29(4), 621–640. https://doi.org/10.3846/mma.2024.19325
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Oct 11, 2024
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