Asymptotic sequence
A sequence of functions $\{\phi_n(x)\}$ such that
$$\phi_{n+1}(x)=o(\phi_n(x)),\quad x\to x_0,\quad x\in M,$$
where $x_0$ is a limit point of the set $M$ (finite or infinite). If the nature of $M$ is clear from the context, then one simply writes $x\to x_0$. If $\{\phi_n(x)\}$ is an asymptotic sequence and $\psi(x)$ is a function defined on $M$, then $\{\psi(x)\phi_n(x)\}$ will also be an asymptotic sequence.
Examples of asymptotic sequences:
1) $\{(x-x_0)^n\},x\to x_0$;
2) $\{x^{-n}\},x\to\infty$;
3) $\{e^xx^{-n}\},x\to\infty$;
4) $\{z^{-n}\},z\to\infty,z\in D$, where $D$ is an unbounded domain in the complex plane. Asymptotic sequences such as 1), 2) and 4) are called asymptotic power sequences.
Comments
References
[a1] | N.G. de Bruijn, "Asymptotic methods in analysis" , Dover, reprint (1981) |
[a2] | A. Erdélyi, "Asymptotic expansions" , Dover, reprint (1956) |
Asymptotic sequence. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Asymptotic_sequence&oldid=55714