Fast optimal entrainment of limit-cycle oscillators by strong periodic inputs via phase-amplitude reduction and Floquet theory
From MaRDI portal
Publication:6556969
DOI10.1063/5.0054603zbMath1546.34077MaRDI QIDQ6556969
Unnamed Author, Shohei Takata, Hiroya Nakao
Publication date: 17 June 2024
Published in: Chaos (Search for Journal in Brave)
Nonlinear oscillations and coupled oscillators for ordinary differential equations (34C15) Qualitative investigation and simulation of ordinary differential equation models (34C60)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Optimal entrainment with smooth, pulse, and square signals in weakly forced nonlinear oscillators
- Chemical oscillations, waves, and turbulence
- Mathematical foundations of neuroscience
- Weakly connected neural networks
- Bifurctions, patterns and symmetry. Selected papers dedicated to the memory of John David Crawford
- Spatiotemporal control to eliminate cardiac alternans using isostable reduction
- Greater accuracy and broadened applicability of phase reduction using isostable coordinates
- Phase reduction and phase-based optimal control for biological systems: a tutorial
- Optimal phase control of biological oscillators using augmented phase reduction
- Supervised learning algorithms for controlling underactuated dynamical systems
- Phase-amplitude reduction of limit cycling systems
- Phase distribution control of a population of oscillators
- Laws of large numbers and Langevin approximations for stochastic neural field equations
- Isostables, isochrons, and Koopman spectrum for the action-angle representation of stable fixed point dynamics
- Spectral properties of dynamical systems, model reduction and decompositions
- Collective phase description of oscillatory convection
- Global Isochrons and Phase Sensitivity of Bursting Neurons
- Global Stability Analysis Using the Eigenfunctions of the Koopman Operator
- Numerical phase reduction beyond the first order approximation
- Phase-amplitude reduction of transient dynamics far from attractors for limit-cycling systems
- Global computation of phase-amplitude reduction for limit-cycle dynamics
- On the Phase Reduction and Response Dynamics of Neural Oscillator Populations
- Analysis of Fluid Flows via Spectral Properties of the Koopman Operator
- On the concept of dynamical reduction: the case of coupled oscillators
- Sparse optimization of mutual synchronization in collectively oscillating networks
- Locking Range Derivations for Injection-Locked Class-E Oscillator Applying Phase Reduction Theory
- A data-driven phase and isostable reduced modeling framework for oscillatory dynamical systems
- Control and Synchronization of Neuron Ensembles
- The geometry of biological time.
- Fast optimal entrainment of limit-cycle oscillators by strong periodic inputs via phase-amplitude reduction and Floquet theory
Related Items (4)
Phase-amplitude reduction and optimal phase locking of collectively oscillating networks ⋮ Fast optimal entrainment of limit-cycle oscillators by strong periodic inputs via phase-amplitude reduction and Floquet theory ⋮ Phase autoencoder for limit-cycle oscillators ⋮ Data-driven transient lift attenuation for extreme vortex gust-airfoil interactions
This page was built for publication: Fast optimal entrainment of limit-cycle oscillators by strong periodic inputs via phase-amplitude reduction and Floquet theory
