An asymptotic solution for traveling waves of a nonlinear-diffusion Fisher's equation
We examine traveling-wave solutions for a generalized nonlinear-diffusion Fisher equation studied by Hayes [J. Math. Biol. 29, 531-537 (1991)]. The density-dependent diffusion coefficient used is motivated by certain polymer diffusion and population dispersal problems. Approximate solutions are constructed using asymptotic expansions. We find that the solution will have a corner layer (a shock in the derivative) as the diffusion coefficient approaches a step function. The corner layer at z = 0 is matched to an outer solution for z < 0 and a boundary layer for z > 0 to produce a complete solution. We show that this model also admits a new class of nonphysical solutions and obtain conditions that restrict the set of valid traveling-wave solutions. © 1994 Springer-Verlag.
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- Bioinformatics
- 49 Mathematical sciences
- 31 Biological sciences
- 06 Biological Sciences
- 01 Mathematical Sciences
Citation
Published In
DOI
EISSN
ISSN
Publication Date
Volume
Issue
Start / End Page
Related Subject Headings
- Bioinformatics
- 49 Mathematical sciences
- 31 Biological sciences
- 06 Biological Sciences
- 01 Mathematical Sciences