Investigation and numerical solution of some 3D internal Dirichlet generalized harmonic problems in finite domains

Investigation and numerical solution of some 3D internal Dirichlet generalized harmonic problems in finite domains

A Dirichlet generalized harmonic problem for finite right circular cylindrical domains is considered. The term “generalized” indicates that a boundary function has a finite number of first kind discontinuity curves. It is shown that if a finite domain is bounded by several surfaces and the curves ar...

Full description

Bibliographic Details
Main Authors: Mamuli Zakradze, Murman Kublashvili, Zaza Sanikidze, Nana Koblishvili
Format: Article
Language:English
Published: Elsevier 2017-04-01
Series:Transactions of A. Razmadze Mathematical Institute
Online Access:http://www.sciencedirect.com/science/article/pii/S234680921630037X
id doaj-73026b917b5c43869335e2e1fda80532
record_format Article
spelling doaj-73026b917b5c43869335e2e1fda805322020-11-24T22:13:25ZengElsevierTransactions of A. Razmadze Mathematical Institute2346-80922017-04-011711103110Investigation and numerical solution of some 3D internal Dirichlet generalized harmonic problems in finite domainsMamuli Zakradze0Murman Kublashvili1Zaza Sanikidze2Nana Koblishvili3Department of Computational Methods, Georgian Technical University N. Muskhelishvili Institute of Computational Mathematics, 77 Kostava st., Tbilisi 0175, Georgia; Corresponding author.Department of Computer-Aided Construction Design, Georgian Technical University, 77 Kostava st., Tbilisi 0175, GeorgiaDepartment of Computational Methods, Georgian Technical University N. Muskhelishvili Institute of Computational Mathematics, 77 Kostava st., Tbilisi 0175, GeorgiaDepartment of Computational Methods, Georgian Technical University N. Muskhelishvili Institute of Computational Mathematics, 77 Kostava st., Tbilisi 0175, GeorgiaA Dirichlet generalized harmonic problem for finite right circular cylindrical domains is considered. The term “generalized” indicates that a boundary function has a finite number of first kind discontinuity curves. It is shown that if a finite domain is bounded by several surfaces and the curves are placed in arbitrary form, then the generalized problem has a unique solution depending continuously on the data. The problem is considered for the simple case when the curves of discontinuity are circles with centers situated on the axis of the cylinder. An algorithm of numerical solution by a probabilistic method is given, which in its turn is based on a computer simulation of the Wiener process. A numerical example is considered to illustrate the effectiveness and simplicity of the proposed method. Keywords: Dirichlet generalized problem, Harmonic function, Cylindrical domain, Discontinuity curve, Probabilistic solutionhttp://www.sciencedirect.com/science/article/pii/S234680921630037X
collection DOAJ
language English
format Article
sources DOAJ
author Mamuli Zakradze
Murman Kublashvili
Zaza Sanikidze
Nana Koblishvili
spellingShingle Mamuli Zakradze
Murman Kublashvili
Zaza Sanikidze
Nana Koblishvili
Investigation and numerical solution of some 3D internal Dirichlet generalized harmonic problems in finite domains
Transactions of A. Razmadze Mathematical Institute
author_facet Mamuli Zakradze
Murman Kublashvili
Zaza Sanikidze
Nana Koblishvili
author_sort Mamuli Zakradze
title Investigation and numerical solution of some 3D internal Dirichlet generalized harmonic problems in finite domains
title_short Investigation and numerical solution of some 3D internal Dirichlet generalized harmonic problems in finite domains
title_full Investigation and numerical solution of some 3D internal Dirichlet generalized harmonic problems in finite domains
title_fullStr Investigation and numerical solution of some 3D internal Dirichlet generalized harmonic problems in finite domains
title_full_unstemmed Investigation and numerical solution of some 3D internal Dirichlet generalized harmonic problems in finite domains
title_sort investigation and numerical solution of some 3d internal dirichlet generalized harmonic problems in finite domains
publisher Elsevier
series Transactions of A. Razmadze Mathematical Institute
issn 2346-8092
publishDate 2017-04-01
description A Dirichlet generalized harmonic problem for finite right circular cylindrical domains is considered. The term “generalized” indicates that a boundary function has a finite number of first kind discontinuity curves. It is shown that if a finite domain is bounded by several surfaces and the curves are placed in arbitrary form, then the generalized problem has a unique solution depending continuously on the data. The problem is considered for the simple case when the curves of discontinuity are circles with centers situated on the axis of the cylinder. An algorithm of numerical solution by a probabilistic method is given, which in its turn is based on a computer simulation of the Wiener process. A numerical example is considered to illustrate the effectiveness and simplicity of the proposed method. Keywords: Dirichlet generalized problem, Harmonic function, Cylindrical domain, Discontinuity curve, Probabilistic solution
url http://www.sciencedirect.com/science/article/pii/S234680921630037X
work_keys_str_mv AT mamulizakradze investigationandnumericalsolutionofsome3dinternaldirichletgeneralizedharmonicproblemsinfinitedomains
AT murmankublashvili investigationandnumericalsolutionofsome3dinternaldirichletgeneralizedharmonicproblemsinfinitedomains
AT zazasanikidze investigationandnumericalsolutionofsome3dinternaldirichletgeneralizedharmonicproblemsinfinitedomains
AT nanakoblishvili investigationandnumericalsolutionofsome3dinternaldirichletgeneralizedharmonicproblemsinfinitedomains
_version_ 1725801165629685760

Similar Items