Suspension (dynamical systems): Difference between revisions

Suspension is a construction passing from a map to a flow. Namely, let ${\displaystyle X}$ be a metric space, ${\displaystyle f:X\to X}$ be a continuous map and ${\displaystyle r:X\to {ℝ}^{+}}$ be a function (roof function or ceiling function) bounded away from 0. Consider the quotient space:

${\displaystyle X_r=\{(x,t):0\le t\le r(x),x\in X\}/(x,r(x))\sim (f(x),0).}$

The suspension of ${\displaystyle (X,f)}$ with roof function ${\displaystyle r}$ is the semiflow^[1] ${\displaystyle f_t:X_r\to X_r}$ induced by the time translation ${\displaystyle T_t:X\times ℝ\to X\times ℝ,(x,s)\mapsto (x,s+t)}$.

If ${\displaystyle r(x)\equiv 1}$, then the quotient space is also called the mapping torus of ${\displaystyle (X,f)}$.

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