Regime shifts are discontinuous transitions between stable attractors hosting a system. They can occur as a result of a loss of stability in an attractor as a bifurcation is approached. In this work, we consider one-dimensional dynamical systems where attractors are stable equilibrium points. Relying on critical slowing down signals related to the stability of an equilibrium point, we present an algorithm for engineering regime shifts such that a system may escape an undesirable attractor into a desirable one. We test the algorithm on synthetic data from a one-dimensional dynamical system with a multitude of stable equilibrium points and also on a model of the population dynamics of spruce budworms in a forest. The algorithm and other ideas...
Stabilizing the dynamics of complex, non-linear systems is a major concern across several scientific...
Abstract. This article is concerned with the formation and per-sistence of spatiotemporal patterns i...
"In this paper, we present a class of 3-D unstable dissipative systems, which are stable in two comp...
Regime shifts are discontinuous transitions between stable attractors hosting a system. They can occ...
Diverse complex dynamical systems are known to exhibit abrupt regime shifts at bifurcation points of...
In this work, we mainly characterize stochastic bifurcations and tipping phenomena of insect outbrea...
A new method is proposed to control delayed transitions towards extinction in single population theo...
Rate-induced transitions have recently emerged as an identifiable type of instability of attractors ...
When populations are in competition, it often happens that one of them disap-pears. Harvesting may b...
While generating a model for a particular system typically relies on the ability to predict the beha...
Abstract — Regime shifts refer to sudden changes in the structure or function of an eco-system due t...
We investigate a method of chaos control in which intervention is proportional to the difference bet...
abstract: Complex dynamical systems are the kind of systems with many interacting components that us...
In this letter we present a simple and accessible way to enhance the stable behaviors of a chaotic d...
Evolutionary Dynamics is a field that combines Dynamical Systems with Game Theory. Game Theory studi...
Stabilizing the dynamics of complex, non-linear systems is a major concern across several scientific...
Abstract. This article is concerned with the formation and per-sistence of spatiotemporal patterns i...
"In this paper, we present a class of 3-D unstable dissipative systems, which are stable in two comp...
Regime shifts are discontinuous transitions between stable attractors hosting a system. They can occ...
Diverse complex dynamical systems are known to exhibit abrupt regime shifts at bifurcation points of...
In this work, we mainly characterize stochastic bifurcations and tipping phenomena of insect outbrea...
A new method is proposed to control delayed transitions towards extinction in single population theo...
Rate-induced transitions have recently emerged as an identifiable type of instability of attractors ...
When populations are in competition, it often happens that one of them disap-pears. Harvesting may b...
While generating a model for a particular system typically relies on the ability to predict the beha...
Abstract — Regime shifts refer to sudden changes in the structure or function of an eco-system due t...
We investigate a method of chaos control in which intervention is proportional to the difference bet...
abstract: Complex dynamical systems are the kind of systems with many interacting components that us...
In this letter we present a simple and accessible way to enhance the stable behaviors of a chaotic d...
Evolutionary Dynamics is a field that combines Dynamical Systems with Game Theory. Game Theory studi...
Stabilizing the dynamics of complex, non-linear systems is a major concern across several scientific...
Abstract. This article is concerned with the formation and per-sistence of spatiotemporal patterns i...
"In this paper, we present a class of 3-D unstable dissipative systems, which are stable in two comp...