Dynamics and patterns of a diffusive Leslie-Gower prey-predator model with strong Allee effect in prey (Q305433)

The authors consider the system of two reaction-diffusion equations NEWLINE\[NEWLINE u_t - d_1 \Delta u = u (1 - u) (u/b - 1) - \beta u v, \quad v_t - d_2 \Delta v = \mu v (1 - v / u), \qquad (x,t)\in\Omega\times(0,\infty), NEWLINE\]NEWLINE where \(\Omega\subset\mathbb{R}^N\) is a smooth and bounded domain, with the homogeneous Neumann boundary conditions on \(\partial\Omega\). Assuming that \(b\in(0,1)\) and \(\beta\), \(\mu\), \(d_1\) and \(d_2\) are positive constants, they look for nonnegative stationary solutions to this problem. First, they describe all nonnegative constant solutions and analyze their stability. Then, they prove several theorems concerned with the existence and non-existence of nonconstant positive solutions for different choices of the system parameters.