Jinfeng Wang scite author profile

Jinfeng Wang

5Publications

23Citation Statements Received

99Citation Statements Given

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158

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Harbin Normal University

Publications

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Dynamics and pattern formations in diffusive predator‐prey models with two prey‐taxis

Guo

Wang

2019

Math Methods in App Sciences

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A reaction‐diffusion two‐predator‐one‐prey system with prey‐taxis describes the spatial interaction and random movement of predator and prey species, as well as the spatial movement of predators pursuing preys. The global existence and boundedness of solutions of the system in bounded domains of arbitrary spatial dimension and any small prey‐taxis sensitivity coefficient are investigated by the semigroup theory. The spatial pattern formation induced by the prey‐taxis is characterized by the Turing type linear instability of homogeneous state; it is shown that prey‐taxis can both compress and prompt the spatial patterns produced through diffusion‐induced instability in two‐predator‐one‐prey systems.

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Dynamics and pattern formations in a three-species predator-prey model with two prey-taxis

Wang

Guo

2019

Journal of Mathematical Analysis and Applications

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Invasion dynamics of a predator-prey system in closed advective environments

Wang

Nie

2022

Journal of Differential Equations

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The stability of equilibria for a reaction–diffusion–ODE system on convex domains

Wang

2019

Applied Mathematics Letters

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The Influence of Dirichlet Boundary Conditions on the Dynamics for a Diffusive Predator–Prey System

Jiang

Wang

Song

2019

Int. J. Bifurcation Chaos

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A reaction–diffusion predator–prey system with homogeneous Dirichlet boundary conditions describes the lethal risk of predator and prey species on the boundary. The spatial pattern formations with the homogeneous Dirichlet boundary conditions are characterized by the Turing type linear instability of homogeneous state and bifurcation theory. Compared with homogeneous Neumann boundary conditions, we see that the homogeneous Dirichlet boundary conditions may depress the spatial patterns produced through the diffusion-induced instability. In addition, the existence of semi-trivial steady states and the global stability of the trivial steady state are characterized by the comparison technique.

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Jinfeng Wang

Dynamics and pattern formations in diffusive predator‐prey models with two prey‐taxis

Dynamics and pattern formations in a three-species predator-prey model with two prey-taxis

Invasion dynamics of a predator-prey system in closed advective environments

The stability of equilibria for a reaction–diffusion–ODE system on convex domains

The Influence of Dirichlet Boundary Conditions on the Dynamics for a Diffusive Predator–Prey System

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