Deposition, diffusion and convection: BLUES approximants and some exact results KU Leuven
An analytic procedure for solving nonlinear differential equations, the BLUES function method, is studied. It is first implemented for differential equations that can be reduced to ordinary differential equations (ODEs) with one independent variable. When an inhomogeneous source (or sink) is present in the equation, the BLUES function method provides a natural way to obtain approximate solutions. In this setup, different systems from ...