DONKIN'S DIFFERENTIAL OPERATORS FOR HOMOGENEOUS HARMONIC FUNCTIONS

DONKIN'S DIFFERENTIAL OPERATORS FOR HOMOGENEOUS HARMONIC FUNCTIONS

The work continues the study of Donkin operators for homogeneous harmonic functions. Previously, a basic list of such first-order operators for three-dimensional harmonic functions was obtained. The objective of this study is to prove that any linear combinations with constant coefficients made up o...

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Bibliographic Details
Main Authors: Berdnikov Alexander, Gall Lidia, Gall Nikolaj, Solovyev Konstantin
Format: Article
Language:English
Published: Peter the Great St.Petersburg Polytechnic University 2019-09-01
Series:St. Petersburg Polytechnical University Journal: Physics and Mathematics
Subjects:
electrostatic field
magnetostatic field
scalar potential
homogeneous function
harmonic function
Online Access:https://physmath.spbstu.ru/article/2019.45.04/
Description
Summary:The work continues the study of Donkin operators for homogeneous harmonic functions. Previously, a basic list of such first-order operators for three-dimensional harmonic functions was obtained. The objective of this study is to prove that any linear combinations with constant coefficients made up of Donkin basic operators are again Donkin operators. Since the property of reversibility is a fundamental property for such operators, and since the reversibility of each of the linear differential operators separately does not automatically imply the reversibility of their linear combination, this statement is nontrivial and requires strict proof given in this paper.
ISSN:2405-7223

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