Suspension (dynamical systems)
id:
suspension-dynamical-systems-265-8886130
title:
Suspension (dynamical systems)
text:
Suspension is a construction passing from a map to a flow. Namely, let X be a metric space, f : X → X be a continuous map and r : X → R + be a function bounded away from 0. Consider the quotient space: The suspension of with roof function r is the semiflow f t : X r → X r induced by the time translation T t : X × R → X × R , ↦ . If r ≡ 1 , then the quotient space is also called the mapping torus of .
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wiki
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encyclopedia
description:
original url:
https://en.wikipedia.org/wiki/Suspension_(dynamical_systems)
date created:
date modified:
2023-09-21T07:58:58Z
main entity:
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13
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13