Journal article
Approximate general solutions to nonlinear reaction-diffusion equations
Mathematical biosciences, v 17(3), pp 367-370
1973
Abstract
Upper and lower bounds
c
̂
+ =
c
̂
+(
x,t)
and
c
̂
− =
c
̂
−(
x,t
are obtained on the solution to the generic initial-value problem for nonlinear reaction-diffusion equations of the form
∂c
∂t
= D∇
2c − gf(c) + f
, where
c = c(
x,t)
is the concentration of a reactant molecular species, φ(c) is a prescribed monotone increasing positive-definite function of c, and
f = f(
x,t)
is a prescribed nonnegative source distribution. It follows from the bounding relation
c
̂
− ⩽ c ⩽
c
̂
+
that a suitably accurate approximate general solution may often be given immediately by
c
̄
≡
1
2
(
c
̂
+ +
c
̂
−)
. This is illustrated here for a second-order process [
i.
e.,
φ(
c) ∝
c
2] in the infinite (unbounded)
x domain.
Metrics
7 Record Views
2 citations in Scopus
Details
- Title
- Approximate general solutions to nonlinear reaction-diffusion equations
- Creators
- Gerald Rosen - Drexel University
- Publication Details
- Mathematical biosciences, v 17(3), pp 367-370
- Publisher
- Elsevier
- Resource Type
- Journal article
- Language
- English
- Academic Unit
- Physics
- Scopus ID
- 2-s2.0-0015889286
- Other Identifier
- 991019173856604721