Dynamics of a Coccinellids-Aphids Model with Stage Structure in Predator Including Maturation and Gestation Delays

Mengran Yuan, Na Wang
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Abstract

This work studies a three-dimensional predator–prey model with gestation delay and stage structure between aphidophagous coccinellids and aphid pests, where the interaction between mature coccinellids and aphids is inscribed by Crowley–Martin functional response function, and immature coccinellids and aphids act in the form of Holling-I type. We prove the positivity and boundedness of the solution of the nondelayed system and analyze its equilibrium point, local asymptotic stability, and global stability. In addition to the delays, the critical values of Hopf bifurcation occurring for different parameters are also found from the numerical simulation. The stability of the delayed system and Hopf bifurcation with different delays as parameters are also discussed. Our model analysis shows that the time delay essentially governs the system’s dynamics, and the stability of the system switches as delays increase. We also investigate the direction and stability of the Hopf bifurcation using the normal form theory and center manifold theorem. Finally, we perform computer simulations and depict diagrams to support our theoretical results.
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含成熟期和妊娠期延迟的捕食者瓢虫-蚜虫阶段结构模型动力学
本文研究了食蚜瓢虫与蚜虫之间具有妊娠延迟和阶段结构的三维捕食-食饵模型,其中成熟瓢虫与蚜虫之间的相互作用由Crowley-Martin功能响应函数记录,未成熟瓢虫与蚜虫之间的相互作用以Holling-I型形式发生。证明了非延迟系统解的正性和有界性,并分析了其平衡点、局部渐近稳定性和全局稳定性。除了时滞外,数值模拟还得到了不同参数下Hopf分岔的临界值。讨论了时滞系统的稳定性和以不同时滞为参数的Hopf分岔问题。我们的模型分析表明,时间延迟本质上控制着系统的动力学,并且随着延迟的增加系统切换的稳定性。利用范式理论和中心流形定理研究了Hopf分岔的方向和稳定性。最后,我们进行了计算机模拟并绘制了图表来支持我们的理论结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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