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Citation |
Chowdhury PR, Petrovskii S, Banerjee M. Mathematics (Basel) 2022; 10(5). |
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Copyright |
(Copyright © 2022, MDPI: Multidisciplinary Digital Publications Institute) |
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DOI |
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PMID |
unavailable |
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Abstract |
Systems with multiple time scales, often referred to as 'slow-fast systems', have been a focus of research for about three decades. Such systems show a variety of interesting, sometimes counter-intuitive dynamical behaviors and are believed to, in many cases, provide a more realistic description of ecological dynamics. In particular, the presence of slow-fast time scales is known to be one of the main mechanisms resulting in long transients--dynamical behavior that mimics a system's asymptotic regime but only lasts for a finite (albeit very long) time. A prey-predator system where the prey growth rate is much larger than that of the predator is a paradigmatic example of slow-fast systems. In this paper, we provide detailed investigation of a more advanced variant of prey-predator system that has been overlooked in previous studies, that is, where the predator response is ratio-dependent and the predator mortality is nonlinear. We perform a comprehensive analytical study of this system to reveal a sequence of bifurcations that are responsible for the change in the system dynamics from a simple steady state and/or a limit cycle to canards and relaxation oscillations. We then consider how those changes in the system dynamics affect the properties of long transient dynamics. We conclude with a discussion of the ecological implications of our findings, in particular to argue that the changes in the system dynamics in response to an increase of the time scale ratio are counter-intuitive or even paradoxical. © 2022 by the authors. Licensee MDPI, Basel, Switzerland. Language: en |
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Keywords |
Evolutionary suicide; Canard cycle; Predator–prey system; Ratio-dependent; Slow–fast dynamics; Transient dynamics |