Positive solutions for singular BVPs on the positive half-line arising from epidemiology and combustion theory

Gabardo and Nashed [Nonuniform multiresolution analysis and spectral pairs, J. Funct. Anal.158 (1998) 209–241] introduced the Nonuniform multiresolution analysis (NUMRA) whose translation set is not a group. Farkov [Orthogonal p-wavelets on ℝ+, in Proc. Int. Conf. Wavelets and Splines (St. Petersburg State University, St. Petersburg, 2005), pp. 4–26] studied multiresolution analysis (MRA) on positive half line and constructed associated wavelets. Meenakshi et al. [Wavelets associated with Nonuniform multiresolution analysis on positive half line, Int. J. Wavelets, Multiresolut. Inf. Process.10(2) (2011) 1250018, 27pp.] studied NUMRA on positive half line and proved the analogue of Cohen's condition for the NUMRA on positive half line. We construct the associated wavelet packets for such an MRA and study its properties.

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Solvability of a Certain System of Singular Integral Equations with Convex Nonlinearity on the Positive Half-Line

Russian Mathematics ◽

10.3103/s1066369x21010035 ◽

2021 ◽

Vol 65 (1) ◽

pp. 27-46

Author(s):

Kh. A. Khachatryan ◽

H. S. Petrosyan

Keyword(s):

Integral Equations ◽

Singular Integral ◽

Singular Integral Equations ◽

Half Line ◽

Positive Half

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Positive Solutions for Singular Third-Order Boundary Value Problem with Dependence on the First Order Derivative on the Half-Line

Acta Applicandae Mathematicae ◽

10.1007/s10440-009-9528-z ◽

2009 ◽

Vol 111 (1) ◽

pp. 27-43 ◽

Cited By ~ 5

Author(s):

Sihua Liang ◽

Jihui Zhang

Keyword(s):

Boundary Value Problem ◽

Positive Solutions ◽

Boundary Value ◽

Order Derivative ◽

Half Line ◽

Third Order ◽

First Order

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Asymptotic solution of Sturm-Liouville problem with periodic boundary conditions for relativistic finite-difference Schrödinger equation

Discrete and Continuous Models and Applied Computational Science ◽

10.22363/2658-4670-2020-28-3-230-251 ◽

2020 ◽

Vol 28 (3) ◽

pp. 230-251

Author(s):

Ilkizar V. Amirkhanov ◽

Irina S. Kolosova ◽

Sergey A. Vasilyev

Keyword(s):

Finite Difference ◽

Boundary Conditions ◽

Periodic Boundary ◽

Asymptotic Series ◽

Periodic Boundary Conditions ◽

Singularly Perturbed ◽

Half Line ◽

Asymptotic Convergence ◽

Relativistic Particles ◽

Positive Half

The quasi-potential approach is very famous in modern relativistic particles physics. This approach is based on the so-called covariant single-time formulation of quantum field theory in which the dynamics of fields and particles is described on a space-like three-dimensional hypersurface in the Minkowski space. Special attention in this approach is paid to methods for constructing various quasi-potentials. The quasipotentials allow to describe the characteristics of relativistic particles interactions in quark models such as amplitudes of hadron elastic scatterings, mass spectra, widths of meson decays and cross sections of deep inelastic scatterings of leptons on hadrons. In this paper SturmLiouville problems with periodic boundary conditions on a segment and a positive half-line for the 2m-order truncated relativistic finite-difference Schrdinger equation (LogunovTavkhelidzeKadyshevsky equation, LTKT-equation) with a small parameter are considered. A method for constructing of asymptotic eigenfunctions and eigenvalues in the form of asymptotic series for singularly perturbed SturmLiouville problems with periodic boundary conditions is proposed. It is assumed that eigenfunctions have regular and boundary-layer components. This method is a generalization of asymptotic methods that were proposed in the works of A. N. Tikhonov, A. B. Vasilyeva, and V. F Butuzov. We present proof of theorems that can be used to evaluate the asymptotic convergence for singularly perturbed problems solutions to solutions of degenerate problems when 0 and the asymptotic convergence of truncation equation solutions in the case m. In addition, the SturmLiouville problem on the positive half-line with a periodic boundary conditions for the quantum harmonic oscillator is considered. Eigenfunctions and eigenvalues are constructed for this problem as asymptotic solutions for 4-order LTKT-equation.

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Attainability to Solve Fractional Differential Inclusion on the Half Line at Resonance

Complexity ◽

10.1155/2020/9609108 ◽

2020 ◽

Vol 2020 ◽

pp. 1-13

Author(s):

Ahmed Salem ◽

Faris Alzahrani ◽

Aeshah Al-Dosari

Keyword(s):

Fractional Derivative ◽

Differential Inclusion ◽

Positive Solutions ◽

Unbounded Domain ◽

Existence Results ◽

Half Line ◽

Fractional Differential Inclusion ◽

At Resonance ◽

Fractional Differential

The presented article is deduced about the positive solutions of the fractional differential inclusion at resonance on the half line. The fractional derivative used is in the sense of Riemann–Liouville and the problem is supplemented by unseparated conditions. The existence results are illustrated in view of Leggett–Williams theorem due to O’Regan and Zima on unbounded domain.

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