Research output: Chapter in Book/Report/Conference proceeding › Chapter › Research › peer-review
An oscillation in a dynamical system can be easily localized numerically if initial conditions from its open neighborhood in the phase space (with the exception of a minor set of points of measure zero) lead to longtime behavior that approaches the oscillation. From a computational point of view, such an oscillation (or a set of oscillations) is called an attractor and its attracting set is called a basin of attraction (i.e., a set of initial data for which the trajectories numerically tend to the attractor).
Original language | English |
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Title of host publication | Handbook of Applications of Chaos Theory |
Publisher | Taylor & Francis |
Pages | 135-143 |
Number of pages | 9 |
ISBN (Electronic) | 9781466590441 |
ISBN (Print) | 9781466590434 |
DOIs | |
State | Published - 1 Jan 2017 |
ID: 7548088