An analytical solution for the two-dimensional discrete ordinates problem in a convex domain

A new method, based on the Kelvin transformation and the Fokas integral method, is employed for solving analytically a potential problem in a non-convex unbounded domain of R 2 , assuming the Neumann boundary condition. Taking advantage of the property of the Kelvin transformation to preserve harmon

The dissolution of a disk-like Al 2 Cu particle is considered. A characteristic property is that initially the particle has a nonsmooth boundary. The mathematical model of this dissolution process contains a description of the particle interface, of which the position varies in time. Such a model is

An integral transform method is used to obtain stress distributions in cracked symmetric two-dimensional projections extending out of the half plane. The case considered includes two collinear external Griffith cracks located at the root of the projection. Two loaded cases are considered. Numerical