Title of article
An efficient family of strongly A-stable Runge–Kutta collocation methods for stiff systems and DAEs. Part II: Convergence results
Author/Authors
Gonzلlez-Pinto، نويسنده , , S. and Hernلndez-Abreu، نويسنده , , D. and Montijano، نويسنده , , J.I.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2012
Pages
12
From page
1349
To page
1360
Abstract
The convergence properties of a newly defined uniparametric family of collocation Runge–Kutta methods on non-stiff systems, stiff semi-linear problems and Differential-Algebraic Equations are analysed. For each s ⩾ 3 , the so-called family of SAFERK methods is based on interpolatory quadrature rules of order 2 s − 3 , and they have the same number of implicit stages as the s-stage LobattoIIIA and ( s − 1 ) -stage RadauIIA methods. Since s-stage SAFERK methods possess the same algebraic order as the ( s − 1 ) -stage RadauIIA method, the corresponding principal terms of local error are compared, and it is shown that those SAFERK methods with positive weights and nodes located in the integration interval possess, in the l 2 -norm, a smaller principal term of local error. Moreover, it is proved that SAFERK methods are convergent when integrating relevant classes of stiff problems and Differential-Algebraic Equations. In particular, they possess a higher stiff order than the RadauIIA method of the same algebraic order, due to a higher stage order of the new methods. On the other hand, because of the strong A-stability, SAFERK methods can be competitive with LobattoIIIA methods, particularly for stiff problems on large time intervals.
Keywords
Runge–Kutta methods , Collocation methods , Strong A-stability , stiff systems , Global order of convergence , differential-algebraic equations
Journal title
Applied Numerical Mathematics
Serial Year
2012
Journal title
Applied Numerical Mathematics
Record number
1529605
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