0 An asymptotic line is a line that gets closer and closer to a curve as the distance gets closer to infinity.
The study focuses on the asymptotic properties of equilibrium paths.
The asymptotic solution (5.3) also be used to obtain expressions from (3.14)for can the fluctuating viscous stresses a t the wall.
Moreover, in many cases, the rejection rates based on finite-sample critical values increase substantially, reflecting the convergence of asymptotic and finite-sample critical values.
For the other sum in the variance the more precise asymptotic estimates (5.1) and (5.2) are required.
Also, an interface appears for the minimal solutions, whose asymptotic velocity is c*.
However, when (6.43) applies, additional regions are required, the asymptotic structure being as described in the previous subsection.
Note that the statistical theory developed in this paper depends crucially on the assumption that spectral density estimates have an asymptotic normal distribution.
The numerical integration is started at the singular point r = 0 by using asymptotic expression of the solutions.