Megastable quantization in self-excited systems
| Autor: | López, Álvaro G., Valani, Rahil N. |
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| Rok vydání: | 2024 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | A classical particle in a confining potential gives rise to a Hamiltonian conservative dynamical system with an uncountably infinite continuous energy spectra, whereas the corresponding quantum particle exhibits countably infinite discrete energy levels. We consider a class of nonlinear self-sustained oscillators describing a classical active particle in a harmonic potential. These nonlinear oscillators emerge in the low-memory regime of both state-dependent time-delay systems as well as in non-Markovian stroboscopic models of walking droplets. Using averaging techniques, we prove the existence of a countably infinite number of asymptotically stable quantized orbits, i.e. megastability, for this class of self-excited systems. The set of periodic orbits consists of a sequence of nested limit-cycle attractors with quasilinear increasing amplitude and alternating stability, yielding smooth basins of attraction. By using the Lyapunov energy function, we estimate the energy spectra of this megastable set of orbits, and perform numerical simulations to confirm the mathematical analysis. Our formalism can be extended to self-excited particles in general confining potentials, resulting in different energy-frequency relations for these dynamical analogs of quantization. Comment: 5 pages, 3 figures |
| Databáze: | arXiv |
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