Nonlocal Problem for a Third-Order Equation with Multiple
Characteristics with General Boundary Conditions

J 2021

Nonlocal Problem for a Third-Order Equation with Multiple Characteristics with General Boundary Conditions

SMETANOVÁ, Dana and Abdukomil RISBEKOVICH KHASHIMOV

Basic information

Original name

Nonlocal Problem for a Third-Order Equation with Multiple Characteristics with General Boundary Conditions

Authors

SMETANOVÁ, Dana (203 Czech Republic, guarantor, belonging to the institution) and Abdukomil RISBEKOVICH KHASHIMOV

Edition

Axioms, Basel, Switzerland, MDPIST ALBAN-ANLAGE 66, CH-4052 BASEL, SWITZERLAND, 2021, 2075-1680

Other information

Language

English

Type of outcome

Článek v odborném periodiku

Field of Study

10100 1.1 Mathematics

Country of publisher

Switzerland

Confidentiality degree

není předmětem státního či obchodního tajemství

References:

URL

RIV identification code

RIV/75081431:_____/21:00002207

Organization unit

Institute of Technology and Business in České Budějovice

Keywords in English

third order equations with multiple characteristic; boundary condition; nonlocal problem; uniqueness theorem; Fredholm integral equation of the second kind; existence theorem

Abstract

V originále

The article considers third-order equations with multiple characteristics with general boundary value conditions and non-local initial data. A regular solution to the problem with known methods is constructed here. The uniqueness of the solution to the problem is proved by the method of energy integrals. This uses the theory of non-negative quadratic forms. The existence of a solution to the problem is proved by reducing the problem to Fredholm integral equations of the second kind. In this case, the method of Green’s function and potential is used.

Files attached

Nonlocal_Problem_for_a_Third-Order_Equation_with_Multiple_Characteristics_with_General_Boundary_Conditions_-_Smetanova.pdf

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Citovat

SMETANOVÁ, Dana and Abdukomil RISBEKOVICH KHASHIMOV. Nonlocal Problem for a Third-Order Equation with Multiple Characteristics with General Boundary Conditions. Axioms. Basel, Switzerland: MDPIST ALBAN-ANLAGE 66, CH-4052 BASEL, SWITZERLAND, 2021, vol. 10, No 2, p. 1-7. ISSN 2075-1680.

@article{61141,
   author = {Smetanová, Dana and Risbekovich Khashimov, Abdukomil},
   article_location = {Basel, Switzerland},
   article_number = {2},
   keywords = {third order equations with multiple characteristic; boundary condition; nonlocal problem; uniqueness theorem; Fredholm integral equation of the second kind; existence theorem},
   language = {eng},
   issn = {2075-1680},
   journal = {Axioms},
   title = {Nonlocal Problem for a Third-Order Equation with Multiple Characteristics with General Boundary Conditions},
   url = {https://www.mdpi.com/2075-1680/10/2/110/htm},
   volume = {10},
   year = {2021}
}

TY  - JOUR
ID  - 61141
AU  - Smetanová, Dana - Risbekovich Khashimov, Abdukomil
PY  - 2021
TI  - Nonlocal Problem for a Third-Order Equation with Multiple Characteristics with General Boundary Conditions
JF  - Axioms
VL  - 10
IS  - 2
SP  - 1-7
EP  - 1-7
PB  - MDPIST ALBAN-ANLAGE 66, CH-4052 BASEL, SWITZERLAND
SN  - 20751680
KW  - third order equations with multiple characteristic
KW  - boundary condition
KW  - nonlocal problem
KW  - uniqueness theorem
KW  - Fredholm integral equation of the second kind
KW  - existence theorem
UR  - https://www.mdpi.com/2075-1680/10/2/110/htm
N2  - The article considers third-order equations with multiple characteristics with general boundary value conditions and non-local initial data. A regular solution to the problem with known methods is constructed here. The uniqueness of the solution to the problem is proved by the method of energy integrals. This uses the theory of non-negative quadratic forms. The existence of a solution to the problem is proved by reducing the problem to Fredholm integral equations of the second kind. In this case, the method of Green’s function and potential is used.
ER  -

SMETANOVÁ, Dana and Abdukomil RISBEKOVICH KHASHIMOV. Nonlocal Problem for a Third-Order Equation with Multiple Characteristics with General Boundary Conditions. \textit{Axioms}. Basel, Switzerland: MDPIST ALBAN-ANLAGE 66, CH-4052 BASEL, SWITZERLAND, 2021, vol.~10, No~2, p.~1-7. ISSN~2075-1680.

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