On Perturbations of the Semigroup of Shifts on the Half-Axis Changing the Domain of Its Generator

The fractional integrals of Bessel-type Fractional Integrals from left-sided and right-sided integrals of fractional order is established on finite and infinite interval of the real-line, half axis and real axis. The Bessel-type fractional derivatives are also established. The properties of Fractional derivatives and integrals are studied. The fractional derivatives of Bessel-type of fractional order on finite of the real-line are studied by graphical representation. Results are direct output of the computer algebra system coded from MATLAB R2011b.

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On the approximation of $ \ exp (-x) $ on the half-axis by spline functions in three-point rational interpolants

Daghestan Electronic Mathematical Reports ◽

10.31029/demr.11.4 ◽

2019 ◽

pp. 32-37

Author(s):

Abdul-Rashid Ramazanov ◽

V.G. Magomedova

Keyword(s):

Convergence Rate ◽

Spline Functions ◽

Rational Spline ◽

Rational Interpolants ◽

Half Axis

For the function $f(x)=\exp(-x)$, $x\in [0,+\infty)$ on grids of nodes $\Delta: 0=x_0<x_1<\dots $ with $x_n\to +\infty$ we construct rational spline-functions such that $R_k(x,f, \Delta)=R_i(x,f)A_{i,k}(x)\linebreak+R_{i-1}(x, f)B_{i,k}(x)$ for $x\in[x_{i-1}, x_i]$ $(i=1,2,\dots)$ and $k=1,2,\dots$ Here $A_{i,k}(x)=(x-x_{i-1})^k/((x-x_{i-1})^k+(x_i-x)^k)$, $B_{i,k}(x)=1-A_{i,k}(x)$, $R_j(x,f)=\alpha_j+\beta_j(x-x_j)+\gamma_j/(x+1)$ $(j=1,2,\dots)$, $R_j(x_m,f)=f(x_m)$ при $m=j-1,j,j+1$; we take $R_0(x,f)\equiv R_1(x,f)$. Bounds for the convergence rate of $R_k(x,f, \Delta)$ with $f(x)=\exp(-x)$, $x\in [0,+\infty)$, are found.

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Solvability of an infinite system of integral equations on the real half-axis

Advances in Nonlinear Analysis ◽

10.1515/anona-2020-0114 ◽

2020 ◽

Vol 10 (1) ◽

pp. 202-216

Author(s):

Józef Banaś ◽

Weronika Woś

Keyword(s):

Integral Equations ◽

Measure Of Noncompactness ◽

Infinite System ◽

Main Tool ◽

Supremum Norm ◽

Nonlinear Integral Equations ◽

Measures Of Noncompactness ◽

System Of Integral Equations ◽

The Real ◽

Half Axis

Abstract The aim of the paper is to investigate the solvability of an infinite system of nonlinear integral equations on the real half-axis. The considerations will be located in the space of function sequences which are bounded at every point of the half-axis. The main tool used in the investigations is the technique associated with measures of noncompactness in the space of functions defined, continuous and bounded on the real half-axis with values in the space l∞ consisting of real bounded sequences endowed with the standard supremum norm. The essential role in our considerations is played by the fact that we will use a measure of noncompactness constructed on the basis of a measure of noncompactness in the mentioned sequence space l∞. An example illustrating our result will be included.

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Inverse spectral problem of an anharmonic oscillator on a half-axis with the Neumann boundary condition

Journal of Inverse and Ill-Posed Problems ◽

10.1515/jiip-2019-0102 ◽

2020 ◽

Vol 0 (0) ◽

Author(s):

Agil K. Khanmamedov ◽

Nigar F. Gafarova

Keyword(s):

Boundary Condition ◽

Neumann Boundary Condition ◽

Inverse Spectral Problem ◽

Anharmonic Oscillator ◽

Neumann Boundary ◽

Effective Algorithm ◽

Inverse Spectral Problems ◽

Main Equation ◽

Inverse Spectral ◽

Half Axis

AbstractAn anharmonic oscillator {T(q)=-\frac{d^{2}}{dx^{2}}+x^{2}+q(x)} on the half-axis {0\leq x<\infty} with the Neumann boundary condition is considered. By means of transformation operators, the direct and inverse spectral problems are studied. We obtain the main integral equations of the inverse problem and prove that the main equation is uniquely solvable. An effective algorithm for reconstruction of perturbed potential is indicated.

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On Determining the Convolution of Identical Distribution Functions by its Values on the Half-Axis

Theory of Probability and Its Applications ◽

10.1137/1126066 ◽

1982 ◽

Vol 26 (3) ◽

pp. 599-600 ◽

Cited By ~ 3

Author(s):

A. N. Titov

Keyword(s):

Distribution Functions ◽

Identical Distribution ◽

Half Axis

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A class of symmetric ordinary differential operators whose deficiency numbers differ by an integer†

Proceedings of the Royal Society of Edinburgh Section A Mathematics ◽

10.1017/s0308210500011100 ◽

1978 ◽

Vol 82 (1-2) ◽

pp. 117-134 ◽

Cited By ~ 4

Author(s):

Richard C. Gilbert

Keyword(s):

Differential Operator ◽

Positive Integer ◽

Asymptotic Expansions ◽

Differential Operators ◽

Ordinary Differential Operator ◽

Ordinary Differential Operators ◽

Half Axis ◽

Complex Coefficients

SynopsisFormulas are determined for the deficiency numbers of a formally symmetric ordinary differential operator with complex coefficients which have asymptotic expansions of a prescribed type on a half-axis. An implication of these formulas is that for any given positive integer there exists a formally symmetric ordinary differential operator whose deficiency numbers differ by that positive integer.

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