Global solutions for a general strongly coupled prey-predator model
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[1] Roger Lui,et al. Existence of global solutions for the Shigesada-Kawasaki-Teramoto model with weak cross-diffusion , 2003 .
[2] Wei-Ming Ni,et al. DIFFUSION, CROSS-DIFFUSION, AND THEIR SPIKE-LAYER STEADY STATES , 1998 .
[3] Yuan Lou,et al. On the global existence of a cross-diffusion system , 1998 .
[4] Mingxin Wang,et al. Qualitative analysis of predator-prey models with Beddington-DeAngelis functional response and diffusion , 2005, Math. Comput. Model..
[5] O. Ladyženskaja. Linear and Quasilinear Equations of Parabolic Type , 1968 .
[6] Herbert Amann,et al. Dynamic theory of quasilinear parabolic equations. II. Reaction-diffusion systems , 1990, Differential and Integral Equations.
[7] Seong-A Shim. Uniform Boundedness and Convergence of Solutions to Cross-Diffusion Systems , 2002 .
[8] 明 大久保,et al. Diffusion and ecological problems : mathematical models , 1980 .
[9] Mingxin Wang,et al. Qualitative analysis of a ratio-dependent predator–prey system with diffusion , 2003, Proceedings of the Royal Society of Edinburgh: Section A Mathematics.
[10] Roger Lui,et al. Existence of global solutions for the Shigesada-Kawasaki-Teramoto model with strongly coupled cross-diffusion , 2004 .
[11] Mingxin Wang,et al. Non‐Constant Positive Steady States of a Predator‐Prey System with Non‐Monotonic Functional Response and Diffusion , 2004 .
[12] Existence of global solutions for a three‐species predator‐prey model with cross‐diffusion , 2008 .
[13] Dung Le,et al. Cross diffusion systems on n spatial dimensional domains , 2002 .
[14] Mohammed Kbiri Alaoui,et al. On Degenerate Parabolic Equations , 2011, Int. J. Math. Math. Sci..
[15] Mingxin Wang,et al. A strongly coupled predator–prey system with non-monotonic functional response ☆ , 2007 .