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On nonlinear biharmonic problems on the Heisenberg group
ID
Zuo, Jiabin
(
Author
),
ID
Taarabti, Said
(
Author
),
ID
An, Tianqing
(
Author
),
ID
Repovš, Dušan
(
Author
)
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MD5: 22F768E5E3F7551E8D4D35174ED5307D
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https://www.mdpi.com/2073-8994/14/4/705
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Abstract
We investigate the boundary value problem for biharmonic operators on the Heisenberg group. The inherent features of ▫$\mathbb{H}^n$▫ make it an appropriate environment for studying symmetry rules and the interaction of analysis and geometry with manifolds. The goal of this paper is to prove that a weak solution for a biharmonic operator on the Heisenberg group exists. Our key tools are a version of the Mountain Pass Theorem and the classical variational theory. This paper will be of interest to researchers who are working on biharmonic operators on ▫$\mathbb{H}^n$▫.
Language:
English
Keywords:
Heisenberg group $\mathbb{H}^n$
,
bi-Kohn Laplacian
,
Mountain Pass Theorem
,
variational theory
Work type:
Article
Typology:
1.01 - Original Scientific Article
Organization:
PEF - Faculty of Education
FMF - Faculty of Mathematics and Physics
Publication status:
Published
Publication version:
Version of Record
Submitted for review:
28.02.2022
Article acceptance date:
25.03.2022
Publication date:
31.03.2022
Year:
2022
Number of pages:
10 str.
Numbering:
Vol. 14, iss. 4
PID:
20.500.12556/RUL-136024
UDC:
517.951.6
ISSN on article:
2073-8994
DOI:
10.3390/sym14040705
COBISS.SI-ID:
103836675
Publication date in RUL:
07.04.2022
Views:
866
Downloads:
130
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Record is a part of a journal
Title:
Symmetry
Shortened title:
Symmetry
Publisher:
Molecular Diversity Preservation International
ISSN:
2073-8994
COBISS.SI-ID:
517592345
Licences
License:
CC BY 4.0, Creative Commons Attribution 4.0 International
Link:
http://creativecommons.org/licenses/by/4.0/
Description:
This is the standard Creative Commons license that gives others maximum freedom to do what they want with the work as long as they credit the author.
Licensing start date:
31.03.2022
Projects
Funder:
ARRS - Slovenian Research Agency
Project number:
P1-0292
Name:
Topologija in njena uporaba
Funder:
ARRS - Slovenian Research Agency
Project number:
N1-0114
Name:
Algebrajski odtisi geometrijskih značilnosti v homologiji
Funder:
ARRS - Slovenian Research Agency
Project number:
N1-0083
Name:
Forsing, fuzija in kombinatorika odprtih pokritij
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