Corrigendum to “Persistence and Stability analysis of discrete-time predator-prey models: a study of population and evolutionary dynamics”, Journal of Difference Equations and Applications, 25(2019), 1568–1603

The present paper deals with the problem of a predator-prey model incorporating a prey refuge with disease in the prey-population. We assume the predator population will prefer only infected population for their diet as those are more vulnerable. Dynamical behaviours such as boundedness, permanence, local and global stabilities are addressed. We have also studied the effect of discrete time delay on the model. The length of delay preserving the stability is also estimated. Computer simulations are carried out to illustrate our analytical findings.

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Local stability analysis on Lotka‐Volterra predator‐prey models with prey refuge and harvesting

Mathematical Methods in the Applied Sciences ◽

10.1002/mma.5234 ◽

2018 ◽

Vol 41 (17) ◽

pp. 7711-7732 ◽

Cited By ~ 1

Author(s):

Christopher Chow ◽

Marvin Hoti ◽

Chongming Li ◽

Kunquan Lan

Keyword(s):

Stability Analysis ◽

Local Stability ◽

Prey Refuge ◽

Predator Prey ◽

Local Stability Analysis ◽

Predator Prey Models

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Hydra effect and paradox of enrichment in discrete-time predator-prey models

Mathematical Biosciences ◽

10.1016/j.mbs.2018.12.010 ◽

2019 ◽

Vol 310 ◽

pp. 120-127 ◽

Cited By ~ 12

Author(s):

Vinicius Weide ◽

Maria C. Varriale ◽

Frank M. Hilker

Keyword(s):

Discrete Time ◽

Predator Prey ◽

Paradox Of Enrichment ◽

Hydra Effect ◽

Predator Prey Models

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Discrete-time, discrete stage-structured predator–prey models

The Journal of Difference Equations and Applications ◽

10.1080/10236190412331335454 ◽

2005 ◽

Vol 11 (4-5) ◽

pp. 399-413 ◽

Cited By ~ 1

Author(s):

Sophia R.-J. Jang ◽

Azmy S. Ackleh

Keyword(s):

Discrete Time ◽

Predator Prey ◽

Predator Prey Models

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Rosenzweig-Macaurther Model with Holling type II Predator Functional Response for Constant Delayed Migration

Asian Research Journal of Mathematics ◽

10.9734/arjom/2019/v15i130140 ◽

2019 ◽

pp. 1-14

Author(s):

Apima B. Samuel ◽

Lawi O. George ◽

Nthiiri J. Kagendo

Keyword(s):

Stability Analysis ◽

Functional Response ◽

Food Source ◽

Type Ii ◽

Human Settlement ◽

Natural Habitats ◽

Predator Prey ◽

Migration Rates ◽

Predator Attack ◽

Predator Prey Models

Predator-prey models describe the interaction between two species, the prey which serves as a food source to the predator. The migration of the prey for safety reasons after a predator attack and the predator in search of food, from a patch to another may not be instantaneous. In this paper, a Rosenzweig-MacAurther model with a Holling-type II predator functional response and time delay in the migration of both species is developed and analysed. Stability analysis of the system shows that depending on the prey growth and prey migration rates either both species go to extinction or co-exist. Numerical simulations show that a longer delay in the migration of the species leads makes the model to stabilize at a slower rate compared to when the delay is shorter. Relevant agencies likethe Kenya Wildlife Service should address factors that slow down migration of species, for example, destruction of natural habitats for human settlement and activities, which may cause delay in migration.

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Discrete dynamics of complex systems

Discrete Dynamics in Nature and Society ◽

10.1155/s1026022697000022 ◽

1997 ◽

Vol 1 (1) ◽

pp. 1-8 ◽

Cited By ~ 4

Author(s):

Hermann Haken

Keyword(s):

Stability Analysis ◽

Discrete Time ◽

Difference Equations ◽

Control Parameter ◽

Multiplicative Noise ◽

Critical Value ◽

Discrete Dynamics ◽

Nonlinear Difference Equations ◽

Starting Point ◽

The Stability

This article extends the slaving principle of synergetics to processes with discrete time steps. Starting point is a set of nonlinear difference equations which contain multiplicative noise and which refer to multidimensional state vectors. The system depends on a control parameter. When its value is changed beyond a critical value, an instability of the solution occurs. The stability analysis allows us to divide the system into stable and unstable modes. The original equations can be transformed to a set of difference equations for the unstable and stable modes. The extension of the slaving principle to the time-discrete case then states that all the stable modes can be explicitly expressed by the unstable modes or so-called order-parameters.

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