On the Uniqueness Classes of Solutions of Boundary Value Problems for Third-Order Equations of the Pseudo-Elliptic Type
Abstract
:1. Introduction
2. Notations and Formulation of the Problem
3. Energy Inequalities
- Let as the domain Q lies inside the rotation body i.e., We have from (15)Suppose thatIn this case, from the inequality (6) we have
- Consider an example of Q for whichIt is clear that if the domain Q is narrowing at If then and this case includes domains lying in the band with the width If then Q can be extended respectively at For this kind of domains, we can assume
4. Conclusions
- (1)
- Establish energy estimates (analogous to the Saint-Venant’s principle) that allow us to determine the widest class of uniqueness of solutions to the problem depending on the geometric characteristics of the domain.
- (2)
- Construction of the solution of the problem under study on an unbounded domain in classes of functions growing at infinity.
- (3)
- Establish estimates for solutions of the problem and its derivatives at infinitely remote boundary points.
Author Contributions
Funding
Conflicts of Interest
Abbreviations
A.R.K | Abdukomil Risbekovich Khashimov |
D.S. | Dana Smetanová |
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Khashimov, A.R.; Smetanová, D. On the Uniqueness Classes of Solutions of Boundary Value Problems for Third-Order Equations of the Pseudo-Elliptic Type. Axioms 2020, 9, 80. https://doi.org/10.3390/axioms9030080
Khashimov AR, Smetanová D. On the Uniqueness Classes of Solutions of Boundary Value Problems for Third-Order Equations of the Pseudo-Elliptic Type. Axioms. 2020; 9(3):80. https://doi.org/10.3390/axioms9030080
Chicago/Turabian StyleKhashimov, Abdukomil Risbekovich, and Dana Smetanová. 2020. "On the Uniqueness Classes of Solutions of Boundary Value Problems for Third-Order Equations of the Pseudo-Elliptic Type" Axioms 9, no. 3: 80. https://doi.org/10.3390/axioms9030080
APA StyleKhashimov, A. R., & Smetanová, D. (2020). On the Uniqueness Classes of Solutions of Boundary Value Problems for Third-Order Equations of the Pseudo-Elliptic Type. Axioms, 9(3), 80. https://doi.org/10.3390/axioms9030080