An age-structured predator-prey system with diffusion and Holling-Tanner-type nonlinearities is considered. Regarding the intensity of the fertility of the predator as bifurcation parameter, we prove that a branch of positive coexistence steady states bifurcates from the marginal steady state with no prey. A similar result is obtained when the fertility of the prey varies.
Positive Equilibrium Solutions for Age and Spatially Structured Population Models
Global dynamics of a predator-prey model with alarm-taxis
Non-existence and uniqueness results for supercritical semilinear elliptic equations
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