On a Class of Monogenic Functions with (Logarithmic) Line Singularities

In the article a new class of monogenic functions with (logarithmic) line singularities is studied, which naturally extend the classical system of outer solid spherical monogenics. These functions have special properties with respect to the hypercomplex derivative (generalized Appell property) and can be generated by a three-term recurrence relation. Furthermore, an explicit decomposition of the harmonic Newton kernel is given by means of these functions and a connection to the Cauchy kernel is shown.