Stability and bifurcation in a single species logistic model with additive Allee effect and feedback control

Abstract: In this paper, we propose a single species logistic model with feedback control and additive Allee effect in the growth of species. The basic aim of the paper is to discuss how the additive Allee effect and feedback control influence the above model's dynamical behaviors. Firstly, the existence and stability of equilibria are discussed under three different cases, i.e., weak Allee effect, strong Allee effect, and the critical case. Secondly, we prove the occurrence of saddle-node bifurcation and transcritical … Show more

“…For r 0 � δ 1 , the trivial equilibrium point E 0 (0, 0) has eigenvalues 0 and − δ 2 . So E 0 (0, 0) is a nonhyperbolic equilibrium point [6]. 4) is locally asymptotically stable and otherwise unstable.…”

“…e dynamical interaction between prey-predator models with different kinds of response function is a dominant theme in applied mathematics and theoretical ecology [1]. Mathematical modeling for prey-predator interplays has drawn attention to the mathematicians and scientists since the pioneering worked by Lotka and Volterra in the year 1920s, and there has been a large investigation for their rich dynamics [2][3][4][5][6]. When we go through the interaction between prey-predator system through mathematical modeling, initially it appears to be very straightforward, but at the end, it becomes very challenging tasks from the view point of mathematicians.…”

“…erefore, many mathematicians attempt to utilize some well-studied methods to obtain situations of global stability of the steady state for the prey-predator model [5][6][7][8][9][10].…”

“…Recently, a series of mathematical models has been developed to better understand the dynamics of the predator-prey system with different kinds of functional responses [6,[16][17][18][19][20][21][22][23][24]. Dalziel et al [16] studied a modified Holling type-II predator-prey model, based on the premise that the search rate of predators is dependent on the prey density, rather than constant.…”

Rich Dynamics of a Predator-Prey System with Different Kinds of Functional Responses

“…For r 0 � δ 1 , the trivial equilibrium point E 0 (0, 0) has eigenvalues 0 and − δ 2 . So E 0 (0, 0) is a nonhyperbolic equilibrium point [6]. 4) is locally asymptotically stable and otherwise unstable.…”

“…e dynamical interaction between prey-predator models with different kinds of response function is a dominant theme in applied mathematics and theoretical ecology [1]. Mathematical modeling for prey-predator interplays has drawn attention to the mathematicians and scientists since the pioneering worked by Lotka and Volterra in the year 1920s, and there has been a large investigation for their rich dynamics [2][3][4][5][6]. When we go through the interaction between prey-predator system through mathematical modeling, initially it appears to be very straightforward, but at the end, it becomes very challenging tasks from the view point of mathematicians.…”

“…erefore, many mathematicians attempt to utilize some well-studied methods to obtain situations of global stability of the steady state for the prey-predator model [5][6][7][8][9][10].…”

“…Recently, a series of mathematical models has been developed to better understand the dynamics of the predator-prey system with different kinds of functional responses [6,[16][17][18][19][20][21][22][23][24]. Dalziel et al [16] studied a modified Holling type-II predator-prey model, based on the premise that the search rate of predators is dependent on the prey density, rather than constant.…”

Rich Dynamics of a Predator-Prey System with Different Kinds of Functional Responses

“…It is universally known that the logistic model is one of the most significant and classical models in mathematical biology. Many scholars have studied it and achieved fruitful results (see [1][2][3][4][5][6][7][8]). e classical logistic equation is expressed by dX(t) � X(t) r − a 1 X(t) dt,…”

Dynamics Analysis of a Stochastic Hybrid Logistic Model with Delay and Two-Pulse Perturbations

Stability and bifurcation of a discrete predator-prey system with Allee effect and other food resource for the predators