Potential Vector Fields in R3 and α-Meridional Mappings of the Second Kind (α ∈ R)

Abstract

This paper extends approach developed in a recent author's paper on analytic models of potential fields in inhomogeneous media. New three-dimensional analytic models of potential vector fields in some layered media are constructed. Properties of various analytic models in Cartesian and cylindrical coordinates in R3 are compared. The original properties of the Jacobian matrix J( V) of potential meridional fields V in cylindrically layered media, where φ( ) = -α (α ∈ R), lead to the concept of α-meridional mappings of the first and second kind. The concept of α-Meridional functions of the first and second kind naturally arises in this way. When α =1, the special concept of Radially holomorphic functions in R3, introduced by G\"urlebeck, Habetha and Spr\"ossig in 2008, is developed in more detail. Certain key properties of the radially holomorphic functions G and functions reversed with respect to G are first characterized. Surprising properties of the radially holomorphic potentials represented by superposition of the radially holomorphic exponential function eβ x (β ∈ R) and function reversed with respect to eβ x are demonstrated explicitly. The basic properties of the radially holomorphic potential represented by the radially holomorphic extension of the Joukowski transformation in R3 are studied.

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