ON THE DISSIPATION OF SINGULAR DIFFERENTIAL OPERATOR OF THE THIRD ORDER

SynopsisThis paper sets out to study the spectrum of self-adjoint extensions of the minimal operator associated with the third-order formally symmetric differential expression. The technique employed is the method of singular sequences. Sufficient conditions are established on the coefficients of the differential expression in order that the spectrum should cover the entire real axis. Particular cases in which the coefficients behave roughly as powers of x as the magnitude of x becomes large are then considered, and certain conclusions are drawn regarding the spectra under different restrictions on these powers of x.

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A Neumann System of the Third Order Differential Operator Associated with the Boussinesq Equation

Journal of Applied Mathematics and Physics ◽

10.4236/jamp.2020.812211 ◽

2020 ◽

Vol 08 (12) ◽

pp. 2861-2868

Author(s):

Jianli Cao ◽

Jingfang Han

Keyword(s):

Differential Operator ◽

Boussinesq Equation ◽

Order Differential Operator ◽

Third Order ◽

Neumann System ◽

The Third

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On Convergence of Orthogonal Expansion of a Function From the Class in the Eigenfunctions of a Differential Operator of the Third Order

WSEAS TRANSACTIONS ON ADVANCES in ENGINEERING EDUCATION ◽

10.37394/232010.2021.18.16 ◽

2021 ◽

Vol 18 ◽

pp. 160-168

Author(s):

Aygun Garayeva ◽

Fatima Guliyeva

Keyword(s):

Differential Operator ◽

Uniform Convergence ◽

Ordinary Differential Operator ◽

Orthogonal Expansion ◽

Third Order ◽

The Third ◽

The Absolute

We consider a third-order ordinary differential operator with summable coefficients. The absolute and uniform convergence of the orthogonal expansion of a function from the class in the eigenfunctionsof this operator is studied and the rate of uniform convergence of these expansions on is estimated

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A Problem on Eigenvalues of Differential Operator of the Third Order with Non-Local Boundary Value Conditions

Journal of Mathematics and Informatics ◽

10.22457/jmi.v14a8 ◽

2018 ◽

Vol 14 ◽

pp. 63-68

Author(s):

Nurlan Imanbaev ◽

◽

Burkhan Kalimbetov

Keyword(s):

Differential Operator ◽

Boundary Value ◽

Third Order ◽

Local Boundary ◽

The Third ◽

Non Local

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Convergence of the Spectral Decomposition of a Function from the Class W p , m 1 G , p > 1 $$ {W}_{p,m}^1(G),p>1 $$ , in the Vector Eigenfunctions of a Differential Operator of the Third Order

Ukrainian Mathematical Journal ◽

10.1007/s11253-017-1400-0 ◽

2017 ◽

Vol 69 (6) ◽

pp. 839-856

Author(s):

Yu. G. Abbasova ◽

V. M. Kurbanov

Keyword(s):

Differential Operator ◽

Spectral Decomposition ◽

Third Order ◽

The Third

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Oscillation Results for Third-Order Semi-Canonical Quasi-Linear Delay Differential Equations

Nonautonomous Dynamical Systems ◽

10.1515/msds-2020-0135 ◽

2021 ◽

Vol 8 (1) ◽

pp. 228-238

Author(s):

K. Saranya ◽

V. Piramanantham ◽

E. Thandapani

Keyword(s):

Differential Equation ◽

Differential Operator ◽

Differential Equations ◽

Delay Differential Equation ◽

Delay Differential Equations ◽

Main Idea ◽

Third Order ◽

The Third ◽

Linear Delay ◽

Delay Differential

Abstract The main purpose of this paper is to study the oscillatory properties of solutions of the third-order quasi-linear delay differential equation ℒ y ( t ) + f ( t ) y β ( σ ( t ) ) = 0 {\cal L}y(t) + f(t){y^\beta }(\sigma (t)) = 0 where ℒy(t) = (b(t)(a(t)(y 0(t)) )0)0 is a semi-canonical differential operator. The main idea is to transform the semi-canonical operator into canonical form and then obtain new oscillation results for the studied equation. Examples are provided to illustrate the importance of the main results.

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Probe size and 5th-order aberration

Proceedings, annual meeting, Electron Microscopy Society of America ◽

10.1017/s0424820100125609 ◽

1987 ◽

Vol 45 ◽

pp. 134-135 ◽

Cited By ~ 1

Author(s):

Zhifeng Shao

Keyword(s):

Electron Probe ◽

Spherical Aberration ◽

Wave Length ◽

Cylindrical Symmetry ◽

Electron Wave ◽

Third Order ◽

The Third ◽

Probe Radius ◽

Small Probe ◽

Probe Size

A small electron probe has many applications in many fields and in the case of the STEM, the probe size essentially determines the ultimate resolution. However, there are many difficulties in obtaining a very small probe.Spherical aberration is one of them and all existing probe forming systems have non-zero spherical aberration. The ultimate probe radius is given byδ = 0.43Csl/4ƛ3/4where ƛ is the electron wave length and it is apparent that δ decreases only slowly with decreasing Cs. Scherzer pointed out that the third order aberration coefficient always has the same sign regardless of the field distribution, provided only that the fields have cylindrical symmetry, are independent of time and no space charge is present. To overcome this problem, he proposed a corrector consisting of octupoles and quadrupoles.

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Children’s Recall of Approximations to English

Journal of Speech and Hearing Research ◽

10.1044/jshr.1602.201 ◽

1973 ◽

Vol 16 (2) ◽

pp. 201-212 ◽

Cited By ~ 3

Author(s):

Elizabeth Carrow ◽

Michael Mauldin

Keyword(s):

Language Development ◽

Fourth Order ◽

Third Order ◽

Memory Processes ◽

The Third ◽

General Index ◽

General Linguistic

As a general index of language development, the recall of first through fourth order approximations to English was examined in four, five, six, and seven year olds and adults. Data suggested that recall improved with age, and increases in approximation to English were accompanied by increases in recall for six and seven year olds and adults. Recall improved for four and five year olds through the third order but declined at the fourth. The latter finding was attributed to deficits in semantic structures and memory processes in four and five year olds. The former finding was interpreted as an index of the development of general linguistic processes.

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