Lijuan Bi, Howard S. Cohl, Hans Volkmer, “Expansion for a Fundamental Solution of Laplace's Equation in Flat-Ring Cyclide Coordinates”, SIGMA, 2022, Volume 18,041, 31 pp.

This article is cited in 2 papers

Expansion for a Fundamental Solution of Laplace's Equation in Flat-Ring Cyclide Coordinates

Lijuan Bi^a, Howard S. Cohl^b, Hans Volkmer^c

^a Department of Mathematics, The Ohio State University at Newark, Newark, OH 43055, USA
^b Applied and Computational Mathematics Division, National Institute of Standards and Technology, Mission Viejo, CA 92694, USA
^c Department of Mathematical Sciences, University of Wisconsin-Milwaukee, Milwaukee, WI 53201-0413, USA

Abstract: We derive an expansion for the fundamental solution of Laplace's equation in flat-ring coordinates in three-dimensional Euclidean space. This expansion is a double series of products of functions that are harmonic in the interior and exterior of “flat rings”. These internal and external flat-ring harmonic functions are expressed in terms of simply-periodic Lamé functions. In a limiting case we obtain the expansion of the fundamental solution in toroidal coordinates.

Keywords: Laplace's equation, fundamental solution, separable curvilinear coordinate system, flat-ring cyclide coordinates, special functions, orthogonal polynomials.

MSC: 35A08, 35J05, 33C05, 33C10, 33C15, 33C20, 33C45, 33C47, 33C55, 33C75

Received: November 20, 2021; in final form May 18, 2022; Published online June 3, 2022

Language: English

DOI: 10.3842/SIGMA.2022.041