Solutions of the nonlinear diffusion equation : existence, uniqueness, and estimation
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Knight, John Howard
Izumi, Masako
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In the first part of the thesis a problem for the nonlinear
diffusion equation with diffusion coefficient a function of concentration,
which is reduced by a similarity substitution to a boundary value
problem for a nonlinear ordinary differential equation, is considered.
Existence of a solution with certain upper and lower bounds is
demonstrated for diffusion coefficient satisfying a local Lipschitz
condition, and uniqueness is proved for non-increasing diffusion
coefficient. An iterative method of Crank and Henry for solving this
problem is investigated and is proved to converge for non-decreasing
diffusion coefficient, thus extending the existence result in this case.
A perturbation method is used to derive a general series solution to the
problem for a class of diffusion coefficients of power-law and
exponential form. More general problems are considered in the last two chapters of the
thesis. It is shown that a particular nonlinear diffusion equation with
flux boundary conditions can be transformed to a linear equation, and new
exact solutions are given to various problems of practical interest
involving this nonlinear diffusion equation. An iterative method
proposed by Parlange to solve various problems for the nonlinear
diffusion equation and related equations is investigated, and it is shown
that the method of Parlange fails to converge. The problems are
formulated as integral equations, and a new iterative method is described
which gives accurate solutions with a minimum of iteration.
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