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Analytical Solutions of Microplastic Particles Dispersion Using a Lotka-Volterra Predator-Prey Model with Time-Varying Intraspecies Coefficients

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Autor(es):
Dos Santos, Lindomar Soares ; Alcaras, Jose Renato ; Da Costa, Lucas Murilo ; Ramos Simoes, Mateus Mendonca ; Martinez, Alexandre Souto
Número total de Autores: 5
Tipo de documento: Artigo Científico
Fonte: MATHEMATICAL AND COMPUTATIONAL APPLICATIONS; v. 27, n. 4, p. 12-pg., 2022-08-01.
Resumo

Discarded plastic is subjected to weather effects from different ecosystems and becomes microplastic particles. Due to their small size, they have spread across the planet. Their presence in living organisms can have several harmful consequences, such as altering the interaction between prey and predator. Huang et al. successfully modeled this system presenting numerical results of ecological relevance. Here, we have rewritten their equations and solved a set of them analytically, confirming that microplastic particles accumulate faster in predators than in prey and calculating the time values from which it happens. Using these analytical solutions, we have retrieved the Lotka-Volterra predator-prey model with time-varying intraspecific coefficients, allowing us to interpret ecological quantities referring to microplastics dispersion. After validating our equations, we solved analytically particular situations of ecological interest, characterized by extreme effects on predatory performance, and proposed a second-order differential equation as a possible next step to address this model. Our results open space for further refinement in the study of predator-prey models under the effects of microplastic particles, either exploring the second-order equation that we propose or modify the Huang et al. model to reduce the number of parameters, embedding in the time-varying intraspecies coefficients all the adverse effects caused by microplastic particles. (AU)

Processo FAPESP: 18/21694-4 - Metamateriais acústicos: campos internos e teoria de espalhamento
Beneficiário:José Renato Alcarás
Modalidade de apoio: Bolsas no Brasil - Doutorado