Iasson Karafyllis, Lars Grune
Published 2008-11-01Version 1
In this work we study the problem of step size selection for numerical schemes, which guarantees that the numerical solution presents the same qualitative behavior as the original system of ordinary differential equations, by means of tools from nonlinear control theory. Lyapunov-based and Small-Gain feedback stabilization methods are exploited and numerous illustrating applications are presented for systems with a globally asymptotically stable equilibrium point. The obtained results can be used for the control of the global discretization error as well.
Comments: 33 pages, 9 figures. Submitted for possible publication to BIT Numerical Mathematics
A posteriori error analysis of round-off errors in the numerical solution of ordinary differential equations
A quantitative investigation into the accumulation of rounding errors in the numerical solution of ODEs
Numerical Solution of a Nonlinear Integro-Differential Equation
![QR code for arXiv:0811.0061 [math.NA]](http://oss.arxitics.com/images/favicon.svg)