Asymptotic condition numbers for linear ordinary differential equations

Abstract

We are interested in the relative conditioning of the problem y0 etAy0, i.e., the relative conditioning of the action of the matrix exponential e% tA on a vector with respect to perturbations of this vector. The present paper is a qualitative study of the long-time behavior of this conditioning. In other words, we are interested in studying the propagation to the solution y(t) of perturbations of the initial value for a linear ordinary differential equation y(t)=Ay(t), by measuring these perturbations with relative errors. We introduce three condition numbers: the first considers a specific initial value and a specific direction of perturbation; the second considers a specific initial value and the worst case by varying the direction of perturbation; and the third considers the worst case by varying both the initial value and the direction of perturbation. The long-time behaviors of these three condition numbers are studied.