Trapping region

In applied mathematics, a trapping region of a dynamical system is a region such that every trajectory that starts within the trapping region will move to the region's interior and remain there as the system evolves.

More precisely, given a dynamical system with flow $\phi _{t}$ defined on the phase space $D$ , a subset of the phase space $N$ is a trapping region if it is compact and $\phi _{t}(N)\subset \mathrm {int} (N)$ for all $t>0$ .^[1]

References

^ Meiss, J. D., Differential dynamical systems, Philadelphia: Society for Industrial and Applied Mathematics, 2007.

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