Litcius/Paper detail

Pattern formation with jump discontinuity in a predator–prey model with Holling-II functional response

Gaihui Guo, Xiaoyi Yang, Conghui Zhang, Shanbing Li

2025European Journal of Applied Mathematics12 citationsDOIOpen Access PDF

Abstract

Abstract This paper is focused on the existence and uniqueness of nonconstant steady states in a reaction–diffusion–ODE system, which models the predator–prey interaction with Holling-II functional response. Firstly, we aim to study the occurrence of regular stationary solutions through the application of bifurcation theory. Subsequently, by a generalized mountain pass lemma, we successfully demonstrate the existence of steady states with jump discontinuity. Furthermore, the structure of stationary solutions within a one-dimensional domain is investigated and a variety of steady-state solutions are built, which may exhibit monotonicity or symmetry. In the end, we create heterogeneous equilibrium states close to a constant equilibrium state using bifurcation theory and examine their stability.

Topics & Concepts

Functional responseDiscontinuity (linguistics)PredationJumpPredatorMathematicsStatistical physicsMathematical analysisPhysicsEcologyBiologyQuantum mechanicsNonlinear Dynamics and Pattern FormationMathematical and Theoretical Epidemiology and Ecology ModelsMathematical Biology Tumor Growth