Difference between revisions of "Limit point of a trajectory"
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A point | A point | ||
− | $$x_\alpha=\lim_{k\to\infty}f^{t_k}x\tag{1}$$ | + | $$x_\alpha=\lim_{k\to\infty}f^{t_k}x\label{1}\tag{1}$$ |
(an $\alpha$-limit point) or | (an $\alpha$-limit point) or | ||
− | $$x_\omega=\lim_{k\to\infty}f^{t_k}x\tag{2}$$ | + | $$x_\omega=\lim_{k\to\infty}f^{t_k}x\label{2}\tag{2}$$ |
− | (an $\omega$-limit point), where $\{t_k\}_{k\in\mathbf N}$ is a sequence such that $t_k\to-\infty$ as $k\to\infty$ in \ | + | (an $\omega$-limit point), where $\{t_k\}_{k\in\mathbf N}$ is a sequence such that $t_k\to-\infty$ as $k\to\infty$ in \eqref{1}, or $t_k\to+\infty$ as $k\to\infty$ in \eqref{2}, and for which the limits in \eqref{1} or \eqref{2} exist. |
For a trajectory $\{f^tx\}$ of a [[Dynamical system|dynamical system]] $f^t$ (or, in other words, for $f(t,x)$, cf. [[#References|[1]]]), an $\alpha$-limit point ($\omega$-limit point) is the same as an $\omega$-limit point ($\alpha$-limit point) of the trajectory $\{f^{-t}x\}$ of the dynamical system $f^{-t}$ (the system with reverse time). The set $\Omega_x$ ($A_x$) of all $\omega$-limit points ($\alpha$-limit points) of a trajectory $\{f^tx\}$ is called the $\omega$-limit set ($\alpha$-limit set) of this trajectory (cf. [[Limit set of a trajectory|Limit set of a trajectory]]). | For a trajectory $\{f^tx\}$ of a [[Dynamical system|dynamical system]] $f^t$ (or, in other words, for $f(t,x)$, cf. [[#References|[1]]]), an $\alpha$-limit point ($\omega$-limit point) is the same as an $\omega$-limit point ($\alpha$-limit point) of the trajectory $\{f^{-t}x\}$ of the dynamical system $f^{-t}$ (the system with reverse time). The set $\Omega_x$ ($A_x$) of all $\omega$-limit points ($\alpha$-limit points) of a trajectory $\{f^tx\}$ is called the $\omega$-limit set ($\alpha$-limit set) of this trajectory (cf. [[Limit set of a trajectory|Limit set of a trajectory]]). |
Latest revision as of 17:08, 14 February 2020
$\{f^tx\}$ of a dynamical system $f^t$
A point
$$x_\alpha=\lim_{k\to\infty}f^{t_k}x\label{1}\tag{1}$$
(an $\alpha$-limit point) or
$$x_\omega=\lim_{k\to\infty}f^{t_k}x\label{2}\tag{2}$$
(an $\omega$-limit point), where $\{t_k\}_{k\in\mathbf N}$ is a sequence such that $t_k\to-\infty$ as $k\to\infty$ in \eqref{1}, or $t_k\to+\infty$ as $k\to\infty$ in \eqref{2}, and for which the limits in \eqref{1} or \eqref{2} exist.
For a trajectory $\{f^tx\}$ of a dynamical system $f^t$ (or, in other words, for $f(t,x)$, cf. [1]), an $\alpha$-limit point ($\omega$-limit point) is the same as an $\omega$-limit point ($\alpha$-limit point) of the trajectory $\{f^{-t}x\}$ of the dynamical system $f^{-t}$ (the system with reverse time). The set $\Omega_x$ ($A_x$) of all $\omega$-limit points ($\alpha$-limit points) of a trajectory $\{f^tx\}$ is called the $\omega$-limit set ($\alpha$-limit set) of this trajectory (cf. Limit set of a trajectory).
References
[1] | V.V. Nemytskii, V.V. Stepanov, "Qualitative theory of differential equations" , Princeton Univ. Press (1960) (Translated from Russian) |
Comments
For a dynamical system with discrete time (or, a cascade) similar definitions and the same terminology are used (now in the above the sequences $\{t_k\}$ have to be in $\mathbf Z$).
Limit point of a trajectory. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Limit_point_of_a_trajectory&oldid=44745