Zhongcai Zhu scite author profile

In this paper, we propose a mosquito population suppression model which is composed of two sub-models switching each other. We assume that the releases of sterile mosquitoes are periodic and impulsive, only sexually active sterile mosquitoes play a role in the mosquito population suppression process, and the survival probability is density-dependent. For the release waiting period T and the release amount c, we find three thresholds denoted by $$T^*$$ T ∗ , $$g^*$$ g ∗ , and $$c^*$$ c ∗ with $$c^*>g^*$$ c ∗ > g ∗ . We show that the origin is a globally or locally asymptotically stable equilibrium when $$c\ge c^*$$ c ≥ c ∗ and $$T\le T^*$$ T ≤ T ∗ , or $$c\in (g^*, c^*)$$ c ∈ ( g ∗ , c ∗ ) and $$T<T^*$$ T < T ∗ . We prove that the model generates a unique globally asymptotically stable T-periodic solution when either $$c\in (g^*, c^*)$$ c ∈ ( g ∗ , c ∗ ) and $$T=T^*$$ T = T ∗ , or $$c>g^*$$ c > g ∗ and $$T>T^*$$ T > T ∗ . Two numerical examples are provided to illustrate our theoretical results.

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Existence and stability of two periodic solutions for an interactive wild and sterile mosquitoes model

Zhu

Yan

Feng

2022

Journal of Biological Dynamics

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Global Dynamics of a Mosquito Population Suppression Model Under a Periodic Release Strategy

Zhu¹,

Feng²,

Hu³

2023

jaac

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Periodic Orbits of a Mosquito Suppression Model Based on Sterile Mosquitoes

et al. 2022

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In this work, we investigate the existence and stability of periodic orbits of a mosquito population suppression model based on sterile mosquitoes. The model switches between two sub-equations as the actual number of sterile mosquitoes in the wild is assumed to take two constant values alternately. Employing the Poincaré map method, we show that the model has at most two T-periodic solutions when the release amount is not sufficient to eradicate the wild mosquitoes, and then obtain some sufficient conditions for the model to admit a unique or exactly two T-periodic solutions. In particular, we observe that the model displays bistability when it admits exactly two T-periodic solutions: the origin and the larger periodic solution are asymptotically stable, and the smaller periodic solution is unstable. Finally, we give two numerical examples to support our lemmas and theorems.

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Global dynamics of a mosquito population suppression model with seasonal switching

Wang¹,

Yu²,

Zheng³

et al. 2023

Adv. Differential Equations

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Zhongcai Zhu

Stability and periodicity in a mosquito population suppression model composed of two sub-models

Existence and stability of two periodic solutions for an interactive wild and sterile mosquitoes model

Global Dynamics of a Mosquito Population Suppression Model Under a Periodic Release Strategy

Periodic Orbits of a Mosquito Suppression Model Based on Sterile Mosquitoes

Global dynamics of a mosquito population suppression model with seasonal switching

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