In this work, we mainly characterize stochastic bifurcations and tipping phenomena of insect outbreak dynamical systems driven by α-stable Lévy processes. In one-dimensional insect outbreak model, we find the fixed points representing refuge and outbreak from the bifurcation curves, and carry out a sensitivity analysis with respect to small changes in the model parameters, the stability index and the noise intensity. We perform the numerical simulations of dynamical trajectories using Monte Carlo methods, which contribute to looking at stochastic hysteresis phenomenon. As for two-dimensional insect outbreak system, we identify the global stability properties of fixed points and express the probability density function by the stationary solu...
We consider stochastic population processes (Markov jump processes) that develop as consequence of t...
In this paper we examine two specific models of dynamical systems in which noise plays a central rol...
We propose a method to obtain phase portraits for stochastic systems. Starting from the Fokker-Planc...
In this work, we mainly characterize stochastic bifurcations and tipping phenomena of insect outbrea...
Abstract:- The aim of the present work is to bring together new tools and developments in physics an...
We propose a method to obtain phase portraits for stochastic systems. Starting from the Fokker-Planc...
This paper describes the dynamics of an infectious disease transmission modified Leslie–Gower type e...
Insects such as locusts and some moths can transform from a solitarious phase when they remain in lo...
This paper investigates the impact of the threshold control strategy and environmental randomness on...
Regime shifts are discontinuous transitions between stable attractors hosting a system. They can occ...
Many biological populations breed seasonally and have nonoverlapping generations, so that their dyna...
An eco-epidemiological model of susceptible Tilapia fish, infected Tilapia fish and Pelicans is inve...
A variety of ecological models exhibit chaotic dynamics because of nonlinearities in population grow...
Environmental tipping points (TPs) leading to abrupt state changes are usually considered in an auto...
We examine stochastic effects, in particular environmental variability, in population models of bio-...
We consider stochastic population processes (Markov jump processes) that develop as consequence of t...
In this paper we examine two specific models of dynamical systems in which noise plays a central rol...
We propose a method to obtain phase portraits for stochastic systems. Starting from the Fokker-Planc...
In this work, we mainly characterize stochastic bifurcations and tipping phenomena of insect outbrea...
Abstract:- The aim of the present work is to bring together new tools and developments in physics an...
We propose a method to obtain phase portraits for stochastic systems. Starting from the Fokker-Planc...
This paper describes the dynamics of an infectious disease transmission modified Leslie–Gower type e...
Insects such as locusts and some moths can transform from a solitarious phase when they remain in lo...
This paper investigates the impact of the threshold control strategy and environmental randomness on...
Regime shifts are discontinuous transitions between stable attractors hosting a system. They can occ...
Many biological populations breed seasonally and have nonoverlapping generations, so that their dyna...
An eco-epidemiological model of susceptible Tilapia fish, infected Tilapia fish and Pelicans is inve...
A variety of ecological models exhibit chaotic dynamics because of nonlinearities in population grow...
Environmental tipping points (TPs) leading to abrupt state changes are usually considered in an auto...
We examine stochastic effects, in particular environmental variability, in population models of bio-...
We consider stochastic population processes (Markov jump processes) that develop as consequence of t...
In this paper we examine two specific models of dynamical systems in which noise plays a central rol...
We propose a method to obtain phase portraits for stochastic systems. Starting from the Fokker-Planc...