The method of fundamental solutions with eigenfunctions expansion method for 3D nonhomogeneous diffusion equations

The Laplace transform is applied to remove the time-dependent variable in the di usion equation. For nonharmonic initial conditions this gives rise to a non-homogeneous modiÿed Helmholtz equation which we solve by the method of fundamental solutions. To do this a particular solution must be obtained

## Abstract Many physical subjects are modeled by nonclassical parabolic boundary value problems with nonlocal boundary conditions replacing the classic boundary conditions. In this article, we introduce a new numerical method for solving the one‐dimensional parabolic equation with nonlocal boundar

kinetic model is proposed for a surface-supported biological film (bioparticle) employed in many biological processes. The equations that govern kinetic and diffusion-controlled substrate uptake by the attached organisms are invariably nonlinear and analytical solutions if any are impossible to find