Title of article
Exponential fitting BDF–Runge–Kutta algorithms Original Research Article
Author/Authors
J. Vigo-Aguiar، نويسنده , , J. Mart?n-Vaquero، نويسنده , , H. Ramos، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2008
Pages
20
From page
15
To page
34
Abstract
In other papers, the authors presented exponential fitting methods of BDF type. Now, these methods are used to derive some BDF–Runge–Kutta type formulas (of second-, third- and fourth-order), capable of the exact integration (with only round-off errors) of differential equations whose solutions are linear combinations of an exponential with parameter A and ordinary polynomials. Theorems of the truncation error reveal the good behavior of the new methods for stiff problems. Plots of their absolute stability regions that include the whole of the negative real axis are provided. Different procedures to find the parameter of the method are proposed, using these techniques there will not be necessary to compute the exponential matrix at each step, even when nonlinear problems are integrated. Numerical examples underscore the efficiency of the proposed codes, especially when they are integrating stiff problems.
Keywords
BDF–Runge–Kutta algorithms , Exponential fitting , Local truncation error , Runge–Kutta methods , Stiff problems , Stability
Journal title
Computer Physics Communications
Serial Year
2008
Journal title
Computer Physics Communications
Record number
1137367
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