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On Solvability of Third-Order Singular Differential Equation
L.N. Gumilyov Eurasian National University, Astana, Kazakhstan.
2017 (engelsk)Inngår i: FAIA 2017: Functional Analysis in Interdisciplinary Applications, Springer, 2017, Vol. 216, s. 106-112Konferansepaper, Publicerat paper (Fagfellevurdert)
##### Abstract [en]

In this paper some new existence and uniqueness results are proved and maximal regularity estimates of solutions of third-order differential equation with unbounded coefficients are given.

##### sted, utgiver, år, opplag, sider
Springer, 2017. Vol. 216, s. 106-112
##### Serie
Springer Proceedings in Mathematics & Statistics, ISSN 2194-1009
Matematik
##### Identifikatorer
Scopus ID: 2-s2.0-85041319582ISBN: 978-3-319-67052-2 (tryckt)ISBN: 978-3-319-67053-9 (digital)OAI: oai:DiVA.org:ltu-68426DiVA, id: diva2:1199323
##### Konferanse
International Conference on Functional analysis in interdisciplinary applications, Astana, Kazakhstan, 2-5 October
Tilgjengelig fra: 2018-04-20 Laget: 2018-04-20 Sist oppdatert: 2018-04-27bibliografisk kontrollert
##### Inngår i avhandling
1. Maximal regularity of the solutions for some degenerate differential equations and their applications
Åpne denne publikasjonen i ny fane eller vindu >>Maximal regularity of the solutions for some degenerate differential equations and their applications
2018 (engelsk)Doktoravhandling, med artikler (Annet vitenskapelig)
##### Alternativ tittel[sv]
Maximal regularitet av lösningarna till några degenererade differentialekvationer och deras tillämpningar
##### Abstract [en]

This PhD thesis deals with the study of existence and uniqueness together with coercive estimates for solutions of certain differential equations.

The thesis consists of six papers (papers A, B, C, D, E and F), two appendices and an introduction, which put these papers and appendices into a more general frame and which also serves as an overview of this interesting field of mathematics.

In the text below the functionsr = r(x), q = q(x), m = m(x) etc. are functions on (−∞,+∞), which are different but well defined in each paper. Paper A deals with the study of separation and approximation properties for the differential operator

$ly=-y''+r(x)y'+s(x)\bar{y}'$

in the Hilbert space $L_2:= L_2 (\mathbb{R}),\ \mathbb{R}=(-\infty, +\infty),$(here $\bar y$ is the complex conjugate of $y$). A coercive estimate for the solution of the second order differential equation $ly=f$ is obtained and its applications to spectral problems for the corresponding differential operator $l$ is demonstrated. Some sufficient conditions for the existence of the solutions of a class of nonlinear second order differential equations on the real axis are obtained.

In paper B necessary and sufficient conditions for the compactness of the resolvent of the second order degenerate differential operator $l$ in $L_2$ is obtained. We also discuss the two-sided estimates for the radius of fredholmness of this operator.

In paper C we consider the minimal closed differential operator

$Ly = -\rho(x)(\rho(x)y')'+ r(x)y' + q(x)y$

in $L_2(\mathbb{R})$, where $\rho=\rho (x), r=r(x)$ are continuously differentiable functions, and $q=q(x)$ is a continuous function. In this paper we show that the operator $L$ is continuously invertible when these coefficients satisfy some suitable conditions and obtain the following estimate for $y \in D(L)$:

$\||-\rho(\rho y')'\||_2+\||r y'\||_2+\||q y\||_2\leq c \||L y\||_2$,

where $D(L)$ is the domain of $L$.

In papers D, E, and F various differential equations of the third order of the form

$-m_1(x)\left(m_2(x)\left(m_3(x)y'\right)'\right)'+[q(x)+ir(x)+\lambda]y=f(x) \ (0.1)$

are studied in the space $L_p(\mathbb{R})$.

In paper D we investigate the case when $m_1=m_3=m$ and $m_2=1$.

Moreover, in paper E the equation (0.1) is studied when $m_3=1$. Finally, in paper F the equation (0.1) is investigated under certain additional conditions on $m_j(x) (j=1,2,3)$.

For these equations we establish sufficient conditions for the existence and uniqueness of the solution, and also prove an estimate of the form

$\left\|m_1(x)(m_2(x)\left(m_3(x)y')'\right)'\right\|^p_p+\left\|(q(x)+ir(x)+\lambda)y\right\|^p_p \leq c \left\|f(x)\right\|^p_p$

for the solution $y$ of equation (0.1).

##### sted, utgiver, år, opplag, sider
Luleå: Luleå University of Technology, 2018
##### Serie
Doctoral thesis / Luleå University of Technology 1 jan 1997 → …, ISSN 1402-1544
Matematik
##### Identifikatorer
urn:nbn:se:ltu:diva-68293 (URN)978-91-7790-100-6 (ISBN)978-91-7790-101-3 (ISBN)
##### Disputas
2018-06-07, E243, Luleå, 10:00 (engelsk)
##### Veileder
Tilgjengelig fra: 2018-04-11 Laget: 2018-04-11 Sist oppdatert: 2018-05-29bibliografisk kontrollert

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##### Av forfatter/redaktør
Akhmetkaliyeva, Raya D.

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