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Research Article | Open Access

Pattern dynamics and Turing instability induced by self-super-cross-diffusive predator-prey model via amplitude equations

Naveed Iqbal1Ranchao Wu2Yeliz Karaca3Rasool Shah4Wajaree Weera5( )
Department of Mathematics, College of Science, University of Ha'il, Ha'il 2440, Saudi Arabia
School of Mathematical Sciences, Anhui University, Anhui 230601, China
University of Massachusetts Medical School, Worcester, MA 01655, USA
Department of Mathematics, Abdul Wali Khan University, Mardan 23200, Pakistan
Department of Mathematics, Faculty of Science, Khon Kaen University, Khon Kaen 40002, Thailand
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Abstract

Incorporating self-diffusion and super-cross diffusion factors into the modeling approach enhances efficiency and realism by having a substantial impact on the scenario of pattern formation. Accordingly, this work analyzes self and super-cross diffusion for a predator-prey model. First, the stability of equilibrium points is explored. Utilizing stability analysis of local equilibrium points, we stabilize the properties that guarantee the emergence of the Turing instability. Weakly nonlinear analysis is used to get the amplitude equations at the Turing bifurcation point (WNA). The stability analysis of the amplitude equations establishes the conditions for the formation of small spots, hexagons, huge spots, squares, labyrinthine, and stripe patterns. Analytical findings have been validated using numerical simulations. Extensive data that may be used analytically and numerically to assess the effect of self-super-cross diffusion on a variety of predator-prey systems.

CLC number: 34C23, 34K18, 35B36, 37G15, 37L10, 49N75, 60J60, 65L12, 70K50

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AIMS Mathematics
Pages 2940-2960

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Cite this article:
Iqbal N, Wu R, Karaca Y, et al. Pattern dynamics and Turing instability induced by self-super-cross-diffusive predator-prey model via amplitude equations. AIMS Mathematics, 2023, 8(2): 2940-2960. https://doi.org/10.3934/math.2023153

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Received: 14 September 2022
Revised: 22 October 2022
Accepted: 01 November 2022
Published: 15 February 2023
©2023 the Author(s), licensee AIMS Press.

This is an open access article distributed under the terms of the Creative Commons Attribution License (https://creativecommons.org/licenses/by/4.0)