论文信息 - On a nonlinear diffusion equation describing population growth

On a nonlinear diffusion equation describing population growth

A nonlinear eigenvalue problem is solved analytically to obtain the shock-like traveling waves of Fisher's nonlinear diffusion equation, with which he described the wave of advance of advantageous genes. A phase-plane analysis of the wave profiles shows that the propagation speed of the waves is linearly proportional to their thickness. The analytic solution is asymptotically accurate in the limit of infinitely large characteristic speeds. However, as they have a minimum threshold value which is not zero, the asymptotic solution turns out to be highly accurate for all propagation speeds. The wave profiles of Fisher's equation are shown to be identical to the steady state solutions of the Korteweg-de Vries-Burgers equation that are obtained when dissipative effects are dominant over dispersive effects.

José Canosa | J. Canosa

[1] J. Cole. On a quasi-linear parabolic equation occurring in aerodynamics , 1951 .

[2] E. Hopf. The partial differential equation ut + uux = μxx , 1950 .

[3] R. Johnson. Shallow Water Waves on a Viscous Fluid—The Undular Bore , 1972 .

[4] Donald S. Cohen,et al. Multiple stable solutions of nonlinear boundary value problems arising in chemical reactor theory , 1971 .

[5] R. Fisher. THE WAVE OF ADVANCE OF ADVANTAGEOUS GENES , 1937 .

[6] E. Montroll. On nonlinear processes involving population growth and diffusion , 1967, Journal of Applied Probability.

[7] A. Jeffrey,et al. Weak Nonlinear Dispersive Waves: A Discussion Centered Around the Korteweg–De Vries Equation , 1972 .

[8] H. Grad,et al. Unified Shock Profile in a Plasma , 1967 .

[9] T. Taylor,et al. A study of numerical methods for solving viscous and inviscid flow problems , 1972 .

[10] José Canosa,et al. Diffusion in Nonlinear Multiplicative Media , 1969 .