Showing total 6,217 results

1. On a paper of Berestycki-Hamel-Rossi and its relations to the weak maximum principle at infinity, with applications.

Author

Magliaro, Marco, Mari, Luciano, and Rigoli, Marco

Subjects

*OPERATOR theory, *DIFFERENTIAL operators, *DIFFERENTIAL equations, *RIEMANNIAN manifolds, *DIFFERENTIAL geometry, *MANIFOLDS (Mathematics)

Abstract

The aim of this paper is to study a new equivalent form of the weak maximum principle for a large class of differential operators on Riemannian manifolds. This new form has been inspired by the work of Berestycki, Hamel and Rossi for trace operators, and allows us to shed new light on it and to introduce a new sufficient bounded Khas'minskii type condition for its validity. We show its effectiveness by applying it to obtain some uniqueness results in a geometric setting. [ABSTRACT FROM AUTHOR]

Published

2018

2. "Differential Equations of Mathematical Physics and Related Problems of Mechanics"—Editorial 2021–2023.

Author

Matevossian, Hovik A.

Subjects

DIFFERENTIAL equations, HYPERBOLIC differential equations, LINEAR differential equations, LAPLACE'S equation, BOUNDARY value problems, INVERSE problems, MATHEMATICAL physics, DIFFERENTIAL operators

Abstract

This document is an editorial for a special issue of the journal Mathematics titled "Differential Equations of Mathematical Physics and Related Problems of Mechanics." The special issue covers a range of topics related to differential equations in mathematical physics and mechanics, including wave equations, spectral theory, scattering, and inverse problems. The editorial provides a summary of the published papers in the special issue, highlighting their contributions to the field. The document emphasizes the importance of the special issue in covering both applied and fundamental aspects of mathematics, physics, and their applications in various fields. The author expresses gratitude to the authors, reviewers, assistants, associate editors, and editors for their contributions to the special issue. The report does not provide specific details about the content of the papers or the nature of the special issue. [Extracted from the article]

Published

2024

3. On a paper by Gesztesy, Simon, and Teschl concerning isospectral deformations of ordinary Schro¨dinger operators

Author

Schmincke, U.-W.

Subjects

*SCHRODINGER operator, *DIFFERENTIAL operators

Abstract

Starting from a selfadjoint Schro¨dinger operator A=−d2/dx2+q with a gap G in its spectrum F. Gesztesy, B. Simon, G. Teschl [J. Analyse Math. 70 (1996) 267–324] succeed in constructing another Schro¨dinger operator A˜=−d2/dx2+q˜ that is unitarily equivalent (and thus isospectral) to A. As the means they apply come from the Weyl–Titchmarsh theory the connections prove to be intricate, in particular the relation between A and A˜. We show that a central assertion in GST's paper rests substantially on factorizations of the form (A−μ)(A−ν)=B*B, A˜B=BA, μ, ν being numbers in G and B an invertible 2nd order differential operator generated by corresponding eigensolutions of A. Hence A˜=UAU* where U is the unitary operator B&z.sfnc;B&z.sfnc;−1. The operators B and U do not occur explicitly in F. Gesztesy, B. Simon, G. Teschl [J. Analyse Math. 70 (1996) 267–324]. [Copyright &y& Elsevier]

Published

2003

4. THE HALF-INVERSE TRANSMISSION PROBLEM FOR A STURM-LIOUVILLE-TYPE DIFFERENTIAL EQUATION WITH THE FIXED DELAY AND NON ZERO INITIAL FUNCTION.

Author

VLADIČIĆ, VLADIMIR, BLITVIĆ, MILICA, and PIKULA, MILENKO

Subjects

BOUNDARY value problems, NEUMANN boundary conditions, DIFFERENTIAL operators, DELAY differential equations, STURM-Liouville equation

Abstract

In this paper, we consider the boundary value problem for the Sturm-Liouville type equation with the fixed delay π/2 and a non zero initial function under transmission conditions at the delay point. We study the case when all parameters within the transmission conditions are known and the potential function is known on the interval (0, π/2). We will prove the uniqueness theorem from two spectra, first with Neumann boundary conditions and second with Cauchy boundary condition. Additionally, we will present an algorithm for the construction of the potential function over the interval (π/2, π). [ABSTRACT FROM AUTHOR]

Published

2024

5. Voronovskaja type theorem for some nonpositive Kantorovich type operators.

Author

VASIAN, BIANCA IOANA

Subjects

KANTOROVICH method, DIFFERENTIAL operators, POSITIVE operators, GENERALIZATION

Abstract

In this paper we will study a Voronovskaja type theorem and a simultaneous approximation result for a new class of generalized Bernstein operators. The new operators are obtained using a generalization of Kantorovich's method, namely, we will introduce a sequence of operators Kln = Dl ... Bn+l ... Il, where Bn+l are Bernstein operators, Dlf = f(l) + al-1f(n-1) + · · · + a1f' + a0f is a differential operator with constant coefficients aj, j ∈ {0, . . ., l - 1} and Il a corresponding antiderivative operator such that Dl ... Il = Id. [ABSTRACT FROM AUTHOR]

Published

2024

6. Combining Max pooling-Laplacian theory and k-means clustering for novel camouflage pattern design.

Author

Minhao Wan, Dehui Zhao, and Baogui Zhao

Subjects

K-means clustering, DIFFERENTIAL operators, COMPUTER-aided design

Abstract

Camouflage is the main means of anti-optical reconnaissance, and camouflage pattern design is an extremely important step in camouflage. Many scholars have proposed many methods for generating camouflage patterns. k-means algorithm can solve the problem of generating camouflage patterns quickly and accurately, but k-means algorithm is prone to inaccurate convergence results when dealing with large data images leading to poor camouflage effects of the generated camouflage patterns. In this paper, we improve the k-means clustering algorithm based on the maximum pooling theory and Laplace's algorithm, and design a new camouflage pattern generation method independently. First, applying the maximum pooling theory combined with discrete Laplace differential operator, the maximum pooling-Laplace algorithm is proposed to compress and enhance the target background to improve the accuracy and speed of camouflage pattern generation; combined with the k-means clustering principle, the background pixel primitives are processed to iteratively calculate the sample data to obtain the camouflage pattern mixed with the background. Using color similarity and shape similarity for evaluation, the results show that the combination of maximum pooling theory with Laplace algorithm and k-means algorithm can effectively solve the problem of inaccurate results of k-means algorithm in processing large data images. The new camouflage pattern generation method realizes the design of camouflage patterns for different backgrounds and achieves good results. In order to verify the practical application value of the design method, this paper produced test pieces based on the designed camouflage pattern generation method and tested the camouflage effect of camouflage pattern in sunny and cloudy days respectively, and the final test results were good. [ABSTRACT FROM AUTHOR]

Published

2022

7. FURTHER DEVELOPMENT ON KRASNER-VUKOVIĆ PARAGRADED STRUCTURES AND p-ADIC INTERPOLATION OF YUBO JIN L-VALUES.

Author

PANCHISHKIN, ALEXEI

Subjects

AUTOMORPHIC forms, ANALYTIC functions, DIFFERENTIAL operators, UNITARY groups, ALGEBRAIC numbers

Abstract

This paper is a joint project with Siegfried Bocherer (Mannheim), developing a recent preprint of Yubo Jin (Durham UK) previous works of Anh Tuan Do (Vietnam) and Dubrovnik, IUC-2016 papers from Sarajevo Journal of Mathematics (Vol.12, No.2-Suppl., 2016). We wish to use paragraded structures [KrVu87], [Vu01] on differential operators and arithmetical automorphic forms on classical groups and show that these structures provide a tool to construct p-adic measures and p-adic L-functions on the corresponding non-archimedean weight spaces. An approach to constructions of automorphic L-functions on unitary groups and their p-adic analogues is presented. For an algebraic group G over a number field K these L functions are certain Euler products L(s, π, r, χ). In particular, our constructions cover the L-functions in [Shi00] via the doubling method of Piatetski-Shapiro and Rallis. A p-adic analogue of L(s, π, r, χ) is a p-adic analytic function Lp(s, π, r, χ) of p-adic arguments s ∊ Zp, χ mod pr which interpolates algebraic numbers defined through the normalized critical values L*(s, π, r, χ) of the corresponding complex analytic L-function. We present a method using arithmetic nearlyholomorphic forms and general quasi-modular forms, related to algebraic automorphic forms. It gives a technique of constructing p-adic zeta-functions via general quasi-modular forms and their Fourier coefficients. [ABSTRACT FROM AUTHOR]

Published

2024

8. Full Symmetric Toda System: Solution via QR-Decomposition.

Author

Talalaev, D. V., Chernyakov, Yu. B., and Sharygin, G. I.

Subjects

REPRESENTATION theory, SYMMETRIC operators, LIE groups, DIFFERENTIAL operators, LIE algebras, LAX pair, SEMISIMPLE Lie groups

Abstract

The full symmetric Toda system is a generalization of the open Toda chain, for which the Lax operator is a symmetric matrix of general form. This system is Liouville integrable and even superintegrable. Deift, Lee, Nando, and Tomei (DLNT) proposed the chopping method for constructing integrals of such a system. In the paper, a solution of Hamiltonian equations for the entire family of DLNT integrals is constructed by using the generalized QR factorization method. For this purpose, certain tensor operations on the space of Lax operators and special differential operators on the Lie algebra are introduced. Both tools can be interpreted in terms of the representation theory of the Lie algebra and are expected to generalize to arbitrary real semisimple Lie algebras. As is known, the full Toda system can be interpreted in terms of a compact Lie group and a flag space. Hopefully, the results on the trajectories of this system obtained in the paper will be useful in studying the geometry of flag spaces. [ABSTRACT FROM AUTHOR]

Published

2023

9. Corrigendum to the papers on Exceptional orthogonal polynomials: J. Approx. Theory 182 (2014) 29–58, 184 (2014) 176–208 and 214 (2017) 9–48.

Author

Durán, Antonio J.

Subjects

*ORTHOGONAL systems, *HILBERT space, *HERMITE polynomials, *DIFFERENCE operators, *DIFFERENTIAL operators

Abstract

We complete a gap in the proof that exceptional polynomials are complete orthogonal systems in the associated Hilbert spaces. [ABSTRACT FROM AUTHOR]

Published

2020

10. ESTIMATES ON INITIAL COEFFICIENT BOUNDS OF SUBCLASSES OF BI-UNIVALENT FUNCTIONS DEFINED BY GENERALIZED DIFFERENTIAL OPERATOR.

Author

Shelake, Girish D., Nilapgol, Sarika K., and Joshi, Santosh B.

Subjects

ANALYTIC functions, DIFFERENTIAL operators, UNIVALENT functions, TERMS & phrases

Abstract

In this present paper, we introduce two new subclasses HkΣ (α, δ, λ, µ, σ) and HkΣ (β, δ, λ, µ, σ) of normalized analytic bi-univalent functions defined in the open unit disk and associated with generalized differential operator. Further, we obtain bounds for the second and third Taylor- Maclaurin coefficients of the functions of these subclasses. Also, we obtain some consequences of results obtained. [ABSTRACT FROM AUTHOR]

Published

2024

11. Wiener Tauberian theorem and half-space problems for parabolic and elliptic equations.

Author

Muravnik, Andrey

Subjects

TAUBERIAN theorems, ELLIPTIC equations, ELLIPTIC differential equations, MEAN value theorems, DIFFERENTIAL operators, DIFFERENTIAL-difference equations, BOUNDARY value problems, HEAT equation

Abstract

For various kinds of parabolic and elliptic partial differential and differential-difference equations, results on the stabilization of solutions are presented. For the Cauchy problem for parabolic equations, the stabilization is treated as the existence of a limit as the time unboundedly increases. For the half-space Dirichlet problem for parabolic equations, the stabilization is treated as the existence of a limit as the independent variable orthogonal to the boundary half-plane unboundedly increases. In the classical case of the heat equation, the necessary and sufficient condition of the stabilization consists of the existence of the limit of mean values of the initial-value (boundary-value) function over balls as the ball radius tends to infinity. For all linear problems considered in the present paper, this property is preserved (including elliptic equations and differential-difference equations). The Wiener Tauberian theorem is used to establish this property. To investigate the differential-difference case, we use the fact that translation operators are Fourier multipliers (as well as differential operators), which allows one to use a standard Gel'fand-Shilov operational scheme. For all quasilinear problems considered in the present paper, the mean value from the stabilization criterion is changed: It undergoes a monotonic map, which is explicitly constructed for each investigated nonlinear boundary-value problem. [ABSTRACT FROM AUTHOR]

Published

2024

12. Exact Finite-Difference Calculus: Beyond Set of Entire Functions.

Author

Tarasov, Vasily E.

Subjects

SET functions, CALCULUS, POWER series, DIFFERENTIAL operators, FUNCTION spaces, INTEGRAL functions, DIFFERENCE operators, SQUARE root

Abstract

In this paper, a short review of the calculus of exact finite-differences of integer order is proposed. The finite-difference operators are called the exact finite-differences of integer orders, if these operators satisfy the same characteristic algebraic relations as standard differential operators of the same order on some function space. In this paper, we prove theorem that this property of the exact finite-differences is satisfies for the space of simple entire functions on the real axis (i.e., functions that can be expanded into power series on the real axis). In addition, new results that describe the exact finite-differences beyond the set of entire functions are proposed. A generalized expression of exact finite-differences for non-entire functions is suggested. As an example, the exact finite-differences of the square root function is considered. The use of exact finite-differences for numerical and computer simulations is not discussed in this paper. Exact finite-differences are considered as an algebraic analog of standard derivatives of integer order. [ABSTRACT FROM AUTHOR]

Published

2024

13. On the Spectrum of the Non-Selfadjoint Differential Operator with an Integral Boundary Condition and NegativeWeight Function.

Author

Çoşkun, Nimet and Görgülü, Merve

Subjects

DIFFERENTIAL operators, GENERALIZATION, HYPERBOLIC functions, EIGENVALUES, ANALYTIC functions

Abstract

In this paper, we shall study the spectral properties of the non-selfadjoint operator in the space ... generated by the Sturm-Liouville differential equation ... with the integral type boundary condition ... and the non-standard weight function ρ (x) = -1 where ... . There are an enormous number of papers considering the positive values of ρ (x) for both continuous and discontinuous cases. The structure of the weight function affects the analytical properties and representations of the solutions of the equation. Differently from the classical literature, we used the hyperbolic type representations of the fundamental solutions of the equation to obtain the spectrum of the operator. Moreover, the conditions for the finiteness of the eigenvalues and spectral singularities were presented. Hence, besides generalizing the recent results, Naimark's and Pavlov's conditions were adopted for the negative weight function case. [ABSTRACT FROM AUTHOR]

Published

2023

14. A Simple Formula for the Generalized Spectrum of Second Order Self-Adjoint Differential Operators.

Author

Nielsen, Bjørn Fredrik and Strakoš, Zdeněk

Subjects

DIFFERENTIAL operators, SPECTRAL theory, SELFADJOINT operators, NEUMANN boundary conditions, ELLIPTIC operators, SOBOLEV spaces

Abstract

We analyze the spectrum of the operator $\Delta{-1} [\nabla \cdot (K\nabla u)]$ subject to homogeneous Dirichlet or Neumann boundary conditions, where $\Delta$ denotes the Laplacian and $K=K(x,y)$ is a symmetric tensor. Our main result shows that this spectrum can be derived from the spectral decomposition $K=Q \Lambda QT$, where $Q=Q(x,y)$ is an orthogonal matrix and $\Lambda=\Lambda(x,y)$ is a diagonal matrix. More precisely, provided that $K$ is continuous, the spectrum equals the convex hull of the ranges of the diagonal function entries of $\Lambda$. The domain involved is assumed to be bounded and Lipschitz. In addition to studying operators defined on infinite-dimensional Sobolev spaces, we also report on recent results concerning their discretized finite-dimensional counterparts. More specifically, even though $\Delta{-1} [\nabla \cdot (K\nabla u)]$ is not compact, it turns out that every point in the spectrum of this operator can, to an arbitrary accuracy, be approximated by eigenvalues of the associated generalized algebraic eigenvalue problems arising from discretizations. Our theoretical investigations are illuminated by numerical experiments. The results presented in this paper extend previous analyses which have addressed elliptic differential operators with scalar coefficient functions. Our investigation is motivated by both preconditioning issues (efficient numerical computations) and the need to further develop the spectral theory of second order PDEs (core analysis). [ABSTRACT FROM AUTHOR]

Published

2024

15. Subordinations Results on a q -Derivative Differential Operator.

Author

Andrei, Loriana and Caus, Vasile-Aurel

Subjects

DIFFERENTIAL operators, ANALYTIC functions, UNIVALENT functions, INTEGRAL operators, SET functions

Abstract

In this research paper, we utilize the q-derivative concept to formulate specific differential and integral operators denoted as R q n , m , λ , F q n , m , λ and G q n , m , λ . These operators are introduced with the aim of generalizing the class of Ruscheweyh operators within the set of univalent functions. We extract certain properties and characteristics of the set of differential subordinations employing specific techniques. By utilizing the newly defined operators, this paper goes on to establish subclasses of analytic functions defined on an open unit disc. Additionally, we delve into the convexity properties of the two recently introduced q-integral operators, F q n , m , λ and G q n , m , λ . Special cases of the primary findings are also discussed. [ABSTRACT FROM AUTHOR]

Published

2024

16. OSCILLATORY AND SPECTRAL PROPERTIES OF A CLASS OF FOURTH–ORDER DIFFERENTIAL OPERATORS VIA A NEW HARDY–TYPE INEQUALITY.

Author

OINAROV, RYSKUL, KALYBAY, AIGERIM, and PERSSON, LARS-ERIK

Subjects

DIFFERENTIAL operators, OPERATOR equations, DIFFERENTIAL equations

Abstract

In this paper, we study oscillatory properties of a fourth-order differential equation and spectral properties of a corresponding differential operator. These properties are established by first proving a new second-order Hardy-type inequality, where the weights are the coefficients of the equation and the operator. This new inequality, in its turn, is established for functions satisfying certain boundary conditions that depend on the boundary behavior of one of its weights at infinity and at zero. [ABSTRACT FROM AUTHOR]

Published

2024

17. A CONSERVATIVE LOW RANK TENSOR METHOD FOR THE VLASOV DYNAMICS.

Author

WEI GUO and JING-MEI QIU

Subjects

SINGULAR value decomposition, VLASOV equation, DIFFERENTIAL operators, CONSERVATION of mass, FINITE differences

Abstract

In this paper, we propose a conservative low rank tensor method to approximate nonlinear Vlasov solutions. The low rank approach is based on our earlier work [W. Guo and J.-M. Qiu, A Low Rank Tensor Representation of Linear Transport and Nonlinear Vlasov Solutions and Their Associated Flow Maps, preprint, https://arxiv.org/abs/2106.08834, 2021]. It takes advantage of the fact that the differential operators in the Vlasov equation are tensor friendly, based on which we propose to dynamically and adaptively build up low rank solution basis by adding new basis functions from discretization of the differential equation, and removing basis from a singular value decomposition (SVD)-type truncation procedure. For the discretization, we adopt a high order finite difference spatial discretization together with a second order strong stability preserving multistep time discretization. While the SVD truncation will remove the redundancy in representing the high dimensional Vlasov solution, it will destroy the conservation properties of the associated full conservative scheme. In this paper, we develop a conservative truncation procedure with conservation of mass, momentum, and kinetic energy densities. The conservative truncation is achieved by an orthogonal projection onto a subspace spanned by 1, v, and v2 in the velocity space associated with a weighted inner product. Then the algorithm performs a weighted SVD truncation of the remainder, which involves a scaling, followed by the standard SVD truncation and rescaling back. The algorithm is further developed in high dimensions with hierarchical Tucker tensor decomposition of high dimensional Vlasov solutions, overcoming the curse of dimensionality. An extensive set of nonlinear Vlasov examples are performed to show the effectiveness and conservation property of proposed conservative low rank approach. Comparison is performed against the nonconservative low rank tensor approach on conservation history of mass, momentum, and energy. [ABSTRACT FROM AUTHOR]

Published

2024

18. SOME REMARKS ON THE MAGNETIC FIELD OPERATORS ∇±iA AND ITS APPLICATIONS.

Author

Wenbo WANG

Subjects

MAGNETIC fields, MATHEMATICS, DIFFERENTIAL operators, SCHRODINGER equation, PARTIAL differential equations

Abstract

In the present paper, we give some remarks on the magnetic field operators ∇±iA. As its applications, we study the Schr¨odinger equation with a magnetic field -Δu+|A(x)|2u+iA(x) ·∇u = μu+|u|pu, x ∈ RN, where u is a complex-valued function and μ ∈ R. When N > 2, for 2 < p+2 < 2N N-2 or N = 2, for 2 < p+2 < +∞, the existence and nonexistence of minimizers of the corresponding minimization problem are given via constrained variational methods. As a by-product, the above equation admits a normalized solution. We point out that the condition divA(x) = 0 plays a crucial role in our study. [ABSTRACT FROM AUTHOR]

Published

2024

19. Certain Quantum Operator Related to Generalized Mittag–Leffler Function.

Author

Yassen, Mansour F. and Attiya, Adel A.

Subjects

QUANTUM operators, GEOMETRIC function theory, ANALYTIC functions, OPERATOR functions, DIFFERENTIAL operators

Abstract

In this paper, we present a novel class of analytic functions in the form h (z) = z p + ∑ k = p + 1 ∞ a k z k in the unit disk. These functions establish a connection between the extended Mittag–Leffler function and the quantum operator presented in this paper, which is denoted by ℵ q , p n (L , a , b) and is also an extension of the Raina function that combines with the Jackson derivative. Through the application of differential subordination methods, essential properties like bounds of coefficients and the Fekete–Szegő problem for this class are derived. Additionally, some results of special cases to this study that were previously studied were also highlighted. [ABSTRACT FROM AUTHOR]

Published

2023

20. Lie symmetry group, exact solutions and conservation laws for multi-term time fractional differential equations.

Author

Miao Yang and Lizhen Wang

Subjects

FRACTIONAL differential equations, CONSERVATION laws (Physics), CONSERVATION laws (Mathematics), SYMMETRY groups, NOETHER'S theorem, DIFFERENTIAL operators

Abstract

In this paper, the time fractional Benjamin-Bona-Mahony-Peregrine (BBMP) equation and time-fractional Novikov equation with the Riemann-Liouville derivative are investigated through the use of Lie symmetry analysis and the new Noether's theorem. Then, we construct their group-invariant solutions by means of Lie symmetry reduction. In addition, the power-series solutions are also obtained with the help of the Erdélyi-Kober (E-K) fractional differential operator. Furthermore, the conservation laws for the time-fractional BBMP equation are established by utilizing the new Noether's theorem. [ABSTRACT FROM AUTHOR]

Published

2023

21. Nonexistence for fractional differential inequalities and systems in the sense of Erdélyi-Kober.

Author

Jleli, Mohamed and Samet, Bessem

Subjects

DIFFERENTIAL operators, FRACTIONAL differential equations, PARTIAL differential equations, INTEGRAL operators, INTEGRAL inequalities

Abstract

Nonexistence theorems constitute an important part of the theory of differential and partial differential equations. Motivated by the numerous applications of fractional differential equations in diverse fields, in this paper, we studied sufficient conditions for the nonexistence of solutions (or, equivalently, necessary conditions for the existence of solutions) for nonlinear fractional differential inequalities and systems in the sense of Erdélyi-Kober. Our approach is based on nonlinear capacity estimates specifically adapted to the Erdélyi-Kober fractional operators and some integral inequalities. [ABSTRACT FROM AUTHOR]

Published

2024

22. Separation method of semifixed variables together with integral bifurcation method for solving generalized time‐fractional thin‐film equations.

Author

Rui, Weiguo and He, Weijun

Subjects

*FRACTIONAL differential equations, *PARTIAL differential equations, *DIFFERENTIAL operators, *EQUATIONS, *SEPARATION of variables, *INTEGRALS

Abstract

It is well known that investigation on exact solutions of nonlinear fractional partial differential equations (PDEs) is a very difficult work compared with integer‐order nonlinear PDEs. In this paper, based on the separation method of semifixed variables and integral bifurcation method, a combinational method is proposed. By using this new method, a class of generalized time‐fractional thin‐film equations are studied. Under two kinds of definitions of fractional derivatives, exact solutions of two generalized time‐fractional thin‐film equations are investigated respectively. Different kinds of exact solutions are obtained and their dynamic properties are discussed. Compared to the results in the existing references, the types of solutions obtained in this paper are abundant and very different from those in the existing references. Investigation shows that the solutions of the model defined by Riemann–Liouville differential operator converge faster than those defined by Caputo differential operator. It is also found that the profiles of some solutions are very similar to solitons, but they are not true soliton solutions. In order to visually show the dynamic properties of these solutions, the profiles of some representative exact solutions are illustrated by 3D graphs. [ABSTRACT FROM AUTHOR]

Published

2024

23. On a m(x)$$ m(x) $$‐polyharmonic Kirchhoff problem without any growth near 0 and Ambrosetti–Rabinowitz conditions.

Author

Harrabi, Abdellaziz, Karim Hamdani, Mohamed, and Fiscella, Alessio

Subjects

*DIFFERENTIAL operators, *MOUNTAIN pass theorem, *CONTINUOUS functions, *HARMONIC maps

Abstract

In this paper, we study a higher order Kirchhoff problem with variable exponent of type M∫Ω|Dru|m(x)m(x)dxΔm(x)ru=f(x,u)inΩ,Dαu=0,on∂Ω,for eachα∈ℝNwith|α|≤r−1,$$ \left\{\begin{array}{ll}M\left({\int}_{\Omega}\frac{{\left&#x0007C;{\mathcal{D}}_ru\right&#x0007C;}&#x0005E;{m(x)}}{m(x)} dx\right){\Delta}_{m(x)}&#x0005E;ru&#x0003D;f\left(x,u\right)& \mathrm{in}\kern0.30em \Omega, \\ {}{D}&#x0005E;{\alpha }u&#x0003D;0,\kern0.30em & \mathrm{on}\kern0.30em \mathrm{\partial \Omega },\kern0.30em \mathrm{for}\ \mathrm{each}\kern0.4em \alpha \in {\mathrm{\mathbb{R}}}&#x0005E;N\kern0.4em \mathrm{with}\kern0.4em \mid \alpha \mid \le r-1,\end{array}\right. $$where Ω⊂ℝN$$ \Omega \subset {\mathrm{\mathbb{R}}}&#x0005E;N $$ is a smooth bounded domain, r∈ℕ∗,m∈C(Ω‾),1

Published

2024

24. Extensions of Some Statistical Concepts to the Complex Domain.

Author

Mathai, Arak M.

Subjects

DIFFERENTIAL forms, MAXIMUM likelihood statistics, DIFFERENTIAL operators, PRINCIPAL components analysis, VECTOR analysis

Abstract

This paper deals with the extension of principal component analysis, canonical correlation analysis, the Cramer–Rao inequality, and a few other statistical concepts in the real domain to the corresponding complex domain. Optimizations of Hermitian forms under a linear constraint, a bilinear form under Hermitian-form constraints, and similar maxima/minima problems in the complex domain are discussed. Some vector/matrix differential operators are developed to handle the above types of problems. These operators in the complex domain and the optimization problems in the complex domain are believed to be new and novel. These operators will also be useful in maximum likelihood estimation problems, which will be illustrated in the concluding remarks. Detailed steps are given in the derivations so that the methods are easily accessible to everyone. [ABSTRACT FROM AUTHOR]

Published

2024

25. A Hybrid Approach Combining the Lie Method and Long Short-Term Memory (LSTM) Network for Predicting the Bitcoin Return.

Author

Bildirici, Melike, Ucan, Yasemen, and Tekercioglu, Ramazan

Subjects

UNCERTAINTY (Information theory), LIE groups, CANTOR sets, DIFFERENTIAL operators, REPRESENTATIONS of algebras

Abstract

This paper introduces hybrid models designed to analyze daily and weekly bitcoin return spanning the periods from 18 July 2010 to 28 December 2023 for daily data, and from 18 July 2010 to 24 December 2023 for weekly data. Firstly, the fractal and chaotic structure of the selected variables was explored. Asymmetric Cantor set, Boundary of the Dragon curve, Julia set z2 −1, Boundary of the Lévy C curve, von Koch curve, and Brownian function (Wiener process) tests were applied. The R/S and Mandelbrot–Wallis tests confirmed long-term dependence and fractionality. The largest Lyapunov test, the Rosenstein, Collins and DeLuca, and Kantz methods of Lyapunov exponents, and the HCT and Shannon entropy tests tracked by the Kolmogorov–Sinai (KS) complexity test determined the evidence of chaos, entropy, and complexity. The BDS test of independence test approved nonlinearity, and the TeraesvirtaNW and WhiteNW tests, the Tsay test for nonlinearity, the LR test for threshold nonlinearity, and White's test and Engle test confirmed nonlinearity and heteroskedasticity, in addition to fractionality and chaos. In the second stage, the standard ARFIMA method was applied, and its results were compared to the LieNLS and LieOLS methods. The results showed that, under conditions of chaos, entropy, and complexity, the ARFIMA method did not yield successful results. Both baseline models, LieNLS and LieOLS, are enhanced by integrating them with deep learning methods. The models, LieLSTMOLS and LieLSTMNLS, leverage manifold-based approaches, opting for matrix representations over traditional differential operator representations of Lie algebras were employed. The parameters and coefficients obtained from LieNLS and LieOLS, and the LieLSTMOLS and LieLSTMNLS methods were compared. And the forecasting capabilities of these hybrid models, particularly LieLSTMOLS and LieLSTMNLS, were compared with those of the main models. The in-sample and out-of-sample analyses demonstrated that the LieLSTMOLS and LieLSTMNLS methods outperform the others in terms of MAE and RMSE, thereby offering a more reliable means of assessing the selected data. Our study underscores the importance of employing the LieLSTM method for analyzing the dynamics of bitcoin. Our findings have significant implications for investors, traders, and policymakers. [ABSTRACT FROM AUTHOR]

Published

2024

26. On a General Family of 2-Orthogonal Polynomial Eigenfunctions of a Third Order Differential Equation via Symbolic Computation.

Author

Mesquita, Teresa Augusta

Abstract

The search for 2-orthogonal polynomial eigenfunctions, with respect to a third order differential operator that does not increase the degree of polynomials, was recently developed in [23] by means of a symbolic approach. This work allowed us to establish some impossible cases as also to present a few families of such 2-orthogonal polynomial sequences. In this paper, we apply the symbolic setup proposed in [23] in order to enlighten us about further 2-orthogonal polynomial solutions of this problem. Concerning a general family inhere described, it is also proved its Hahn-classical character. Additionally, some functional identities are established. [ABSTRACT FROM AUTHOR]

Published

2024

27. Duals of Gelfand-Shilov spaces of type K{Mp} for the Hankel transformation.

Author

García-Baquerín, Samuel and Marrero, Isabel

Subjects

DERIVATIVES (Mathematics), DIFFERENTIAL operators, SEQUENCE spaces, TOPOLOGY

Abstract

For µ ≥ −1/2, and under appropriate conditions on the sequence {Mp}∞p=0 of weights, the elements, the (weakly, weakly*, strongly) bounded subsets, and the (weakly, weakly*, strongly) convergent sequences in the dual of a space Kµ of type Hankel-K{Mp} can be represented by distributional derivatives of functions and measures in terms of iterated adjoints of the differential operator x−1Dx and the Bessel operator Sµ = x−µ−1/2 Dx x 2µ+1Dxx−µ−1/2. In this paper, such representations are compiled, and new ones involving adjoints of suitable iterations of the Zemanian differential operator Nµ = xµ+1/2Dxx−µ−1/2 are proved. Prior to this, new descriptions of the topology of the space Kµ are given in terms of the latter iterations. [ABSTRACT FROM AUTHOR]

Published

2024

28. Fourth order Hankel determinants for certain subclasses of modified sigmoid-activated analytic functions involving the trigonometric sine function.

Author

Srivastava, Hari M., Khan, Nazar, Bah, Muhtarr A., Alahmade, Ayman, Tawfiq, Ferdous M. O., and Syed, Zainab

Subjects

HANKEL functions, SINE function, ANALYTIC functions, TRIGONOMETRIC functions, UNIVALENT functions, DIFFERENTIAL operators

Abstract

The aim of this paper is to introduce two new subclasses R sin m (ℑ) and R sin (ℑ) of analytic functions by making use of subordination involving the sine function and the modified sigmoid activation function ℑ (v) = 2 1 + e − v , v ≥ 0 in the open unit disc E. Our purpose is to obtain some initial coefficients, Fekete–Szego problems, and upper bounds for the third- and fourth-order Hankel determinants for the functions belonging to these two classes. All the bounds that we will find here are sharp. We also highlight some known consequences of our main results. [ABSTRACT FROM AUTHOR]

Published

2024

29. Product type operators on vector valued derivative Besov spaces.

Author

Nasresfahani, Sepideh, Abbasi, Ebrahim, and Molaei, Daryoush

Subjects

BESOV spaces, FUNCTION spaces, INTEGRALS, DIFFERENTIAL equations, DIFFERENTIAL operators

Abstract

In this paper, we characterize the boundedness and compactness of product type operators, including Stević-Sharma operator ..., from weak vector valued derivative Besov space wEβp X) into weak vector-valued Besov space wBβp(X). As an application, we obtain the boundedness and compactness characterizations of the weighted composition operator on the weak vector valued derivative Besov space. [ABSTRACT FROM AUTHOR]

Published

2024

30. On Cauchy-type problems with weighted R-L fractional derivatives of a function with respect to another function and comparison theorems.

Author

Ben Othmane, Iman, Nisse, Lamine, and Abdeljawad, Thabet

Subjects

NONLINEAR differential equations, FRACTIONAL differential equations, DIFFERENTIAL operators, FRACTIONAL calculus, NONLINEAR integral equations, DIFFERENTIAL inequalities, CAUCHY problem

Abstract

The main aim of this paper is to study the Cauchy problem for nonlinear differential equations of fractional order containing the weighted Riemann-Liouville fractional derivative of a function with respect to another function. The equivalence of this problem and a nonlinear Volterratype integral equation of the second kind have been presented. In addition, the existence and uniqueness of the solution to the considered Cauchy problem are proved using Banach's fixed point theorem and the method of successive approximations. Finally, we obtain a new estimate of the weighted Riemann-Liouville fractional derivative of a function with respect to functions at their extreme points. With the assistance of the estimate obtained, we develop the comparison theorems of fractional differential inequalities, strict as well as nonstrict, involving weighted Riemann-Liouville differential operators of a function with respect to functions of order d, 0 < d < 1. [ABSTRACT FROM AUTHOR]

Published

2024

31. Bressoud–Subbarao Type Weighted Partition Identities for a Generalized Divisor Function.

Author

Agarwal, Archit, Bhoria, Subhash Chand, Eyyunni, Pramod, and Maji, Bibekananda

Subjects

DIFFERENTIAL operators, GENERALIZATION, ARGUMENT

Abstract

In 1984, Bressoud and Subbarao obtained an interesting weighted partition identity for a generalized divisor function, by means of combinatorial arguments. Recently, the last three named authors found an analytic proof of the aforementioned identity of Bressoud and Subbarao starting from a q-series identity of Ramanujan. In the present paper, we revisit the combinatorial arguments of Bressoud and Subbarao, and derive a more general weighted partition identity. Furthermore, with the help of a fractional differential operator, we establish a few more Bressoud–Subbarao type weighted partition identities beginning from an identity of Andrews, Garvan and Liang. We also found a one-variable generalization of an identity of Uchimura related to Bell polynomials. [ABSTRACT FROM AUTHOR]

Published

2024

32. Numerical Recovering of Space-Dependent Sources in Hyperbolic Transmission Problems.

Author

Koleva, Miglena N. and Vulkov, Lubin G.

Subjects

HYPERBOLIC differential equations, FINITE difference method, INVERSE problems, DIFFERENTIAL operators, SOBOLEV spaces, THEORY of wave motion

Abstract

A body may have a structural, thermal, electromagnetic or optical role. In wave propagation, many models are described for transmission problems, whose solutions are defined in two or more domains. In this paper, we consider an inverse source hyperbolic problem on disconnected intervals, using solution point constraints. Applying a transform method, we reduce the inverse problems to direct ones, which are studied for well-posedness in special weighted Sobolev spaces. This means that the inverse problem is said to be well posed in the sense of Tikhonov (or conditionally well posed). The main aim of this study is to develop a finite difference method for solution of the transformed hyperbolic problems with a non-local differential operator and initial conditions. Numerical test examples are also analyzed. [ABSTRACT FROM AUTHOR]

Published

2024

33. Analyzing a Dynamical System with Harmonic Mean Incidence Rate Using Volterra–Lyapunov Matrices and Fractal-Fractional Operators.

Author

Riaz, Muhammad, Alqarni, Faez A., Aldwoah, Khaled, Birkea, Fathea M. Osman, and Hleili, Manel

Subjects

GLOBAL analysis (Mathematics), EPIDEMIOLOGICAL models, DYNAMICAL systems, COMPUTATIONAL neuroscience, DIFFERENTIAL operators, STABILITY theory

Abstract

This paper investigates the dynamics of the SIR infectious disease model, with a specific emphasis on utilizing a harmonic mean-type incidence rate. It thoroughly analyzes the model's equilibrium points, computes the basic reproductive rate, and evaluates the stability of the model at disease-free and endemic equilibrium states, both locally and globally. Additionally, sensitivity analysis is carried out. A sophisticated stability theory, primarily focusing on the characteristics of the Volterra–Lyapunov (V-L) matrices, is developed to examine the overall trajectory of the model globally. In addition to that, we describe the transmission of infectious disease through a mathematical model using fractal-fractional differential operators. We prove the existence and uniqueness of solutions in the SIR model framework with a harmonic mean-type incidence rate by using the Banach contraction approach. Functional analysis is used together with the Ulam–Hyers (UH) stability approach to perform stability analysis. We simulate the numerical results by using a computational scheme with the help of MATLAB. This study advances our knowledge of the dynamics of epidemic dissemination and facilitates the development of disease prevention and mitigation tactics. [ABSTRACT FROM AUTHOR]

Published

2024

34. Novel Investigation of Stochastic Fractional Differential Equations Measles Model via the White Noise and Global Derivative Operator Depending on Mittag-Leffler Kernel.

Author

Rashid, Saima and Jarad, Fahd

Subjects

FRACTIONAL differential equations, WHITE noise, MEASLES, DIFFERENTIAL operators, MATHEMATICAL models, KERNEL functions

Abstract

Because of the features involved with their varied kernels, differential operators relying on convolution formulations have been acknowledged as effective mathematical resources for modeling real-world issues. In this paper, we constructed a stochastic fractional framework of measles spreading mechanisms with dual medication immunization considering the exponential decay and Mittag-Leffler kernels. In this approach, the overall population was separated into five cohorts. Furthermore, the descriptive behavior of the system was investigated, including prerequisites for the positivity of solutions, invariant domain of the solution, presence and stability of equilibrium points, and sensitivity analysis. We included a stochastic element in every cohort and employed linear growth and Lipschitz criteria to show the existence and uniqueness of solutions. Several numerical simulations for various fractional orders and randomization intensities are illustrated. [ABSTRACT FROM AUTHOR]

Published

2024

35. Nonlocal thermo-hydro-mechanical (THM) coupling dynamic response of saturated porous thermoelastic media with temperature-dependent physical properties.

Author

Wen, Minjie, Wang, Kuihua, Wu, Juntao, and Xiong, Houren

Subjects

PORE water pressure, THERMOELASTICITY, DIFFERENTIAL operators, POROUS materials, THEORY of wave motion, ANALYTICAL solutions, FORCED convection

Abstract

The coupled thermal-hydro-mechanical (THM) analysis of saturated porous media is of great significance and has been widely used in various engineering fields. However, the classical Biot theory assumes that the physical parameters of porous media are constant and ignores the influence of pore size on wave propagation characteristics, which cannot reflect the actual situation. Based on the nonlocal theory and Biot wave equation, a nonlocal coupled Biot THM dynamic model for porous media with variable physical properties is established by introducing the temperature-dependent factor function. Utilizing the nonlocal coupled Biot THM theory, the dynamic response of forced convection in a half-space saturated porous media under surface harmonic thermal action is investigated in this paper. The analytical solutions of temperature increment, displacement, stress, and pore water pressure of saturated porous media are obtained by means of differential operator decomposition. In addition, the effects of the temperature-dependent factor and porosity on the nonlocal model at different frequencies, and the effects of the nonlocal parameter on the distribution rules of various physical fields at different frequencies are explored in depth. [ABSTRACT FROM AUTHOR]

Published

2024

36. Results for Analytic Function Associated with Briot–Bouquet Differential Subordinations and Linear Fractional Integral Operators.

Author

Amini, Ebrahim, Salameh, Wael, Al-Omari, Shrideh, and Zureigat, Hamzeh

Subjects

FRACTIONAL integrals, DIFFERENTIAL operators, HYPERGEOMETRIC functions, GAUSSIAN function, CONVEX sets, INTEGRAL operators, ANALYTIC functions

Abstract

In this paper, we present a new class of linear fractional differential operators that are based on classical Gaussian hypergeometric functions. Then, we utilize the new operators and the concept of differential subordination to construct a convex set of analytic functions. Moreover, through an examination of a certain operator, we establish several notable results related to differential subordination. In addition, we derive inclusion relation results by employing Briot–Bouquet differential subordinations. We also introduce a perspective study for developing subordination results using Gaussian hypergeometric functions and provide certain properties for further research in complex dynamical systems. [ABSTRACT FROM AUTHOR]

Published

2024

37. Estimates for the Approximation and Eigenvalues of the Resolvent of a Class of Singular Operators of Parabolic Type.

Author

Muratbekov, Mussakan, Muratbekov, Madi, and Igissinov, Sabit

Subjects

PARABOLIC operators, EIGENVALUES, DISTRIBUTION (Probability theory), DIFFERENTIAL operators, RESOLVENTS (Mathematics), CARLEMAN theorem

Abstract

In this paper, we study a differential operator of parabolic type with a variable and unbounded coefficient, defined on an infinite strip. Sufficient conditions for the existence and compactness of the resolvent are established, and an estimate for the maximum regularity of solutions of the equation L u = f ∈ L 2 (Ω) is obtained. Two-sided estimates for the distribution function of approximation numbers are obtained. As is known, estimates of approximation numbers show the rate of best approximation of the resolvent of an operator by finite-dimensional operators. The paper proves the assertion about the existence of positive eigenvalues among the eigenvalues of the given operator and finds two-sided estimates for them. [ABSTRACT FROM AUTHOR]

Published

2023

38. Best Constant in Ulam Stability for the Third Order Linear Differential Operator with Constant Coefficients.

Author

Baias, Alina Ramona and Popa, Dorian

Subjects

LINEAR operators, LINEAR orderings, STABILITY constants, BANACH spaces, DIFFERENTIAL operators

Abstract

The authors of the present paper previously proved the Ulam stability for the n-th-order linear differential operator with constant coefficients. They obtained its best Ulam constant for the case of distinct roots of the characteristic equation. However, a complete answer to the problem of the best Ulam constant was later obtained only for the second-order linear differential operator. This paper deals with the Ulam stability of the third-order linear differential operator with constant coefficients acting in a Banach space. The paper's main purpose is to obtain the best Ulam constant of this operator, thus completing the previous research in the field. [ABSTRACT FROM AUTHOR]

Published

2023

39. Two-Dimensional Diffusion Orthogonal Polynomials Ordered by a Weighted Degree.

Author

Orevkov, S. Yu.

Subjects

ORTHONORMAL basis, DIFFERENTIAL operators, ORTHOGONAL polynomials, POLYNOMIALS, EIGENVECTORS, PROBLEM solving

Abstract

We study the problem of describing the triples , , where is the (co)metric associated with a symmetric second-order differential operator defined on a domain of and such that there exists an orthonormal basis of consisting of polynomials which are eigenvectors of and this basis is compatible with the filtration of the space of polynomials by some weighted degree. In a joint paper of D. Bakry, M. Zani, and the author this problem was solved in dimension 2 for the usual degree. In the present paper we solve it still in dimension 2 but for a weighted degree with arbitrary positive weights. [ABSTRACT FROM AUTHOR]

Published

2023

40. Fractional-Order Total Variation Geiger-Mode Avalanche Photodiode Lidar Range-Image Denoising Algorithm Based on Spatial Kernel Function and Range Kernel Function.

Author

Wei, Xuyang, Wang, Chunyang, Xie, Da, Yuan, Kai, Liu, Xuelian, Wang, Zihao, Wang, Xinjian, and Huang, Tingsheng

Subjects

KERNEL functions, LIDAR, OPTICAL radar, MONTE Carlo method, DIFFERENTIAL evolution, DIFFERENTIAL operators

Abstract

A Geiger-mode avalanche photodiode (GM-APD) laser radar range image has much noise when the signal-to-background ratios (SBRs) are low, making it difficult to recover the real target scene. In this paper, based on the GM-APD lidar denoising model of fractional-order total variation (FOTV), the spatial relationship and similarity relationship between pixels are obtained by using a spatial kernel function and range kernel function to optimize the fractional differential operator, and a new FOTV GM-APD lidar range-image denoising algorithm is designed. The lost information and range anomalous noise are suppressed while the target details and contour information are preserved. The Monte Carlo simulation and experimental results show that, under the same SBRs and statistical frame number, the proposed algorithm improves the target restoration degree by at least 5.11% and the peak signal-to-noise ratio (PSNR) by at least 24.6%. The proposed approach can accomplish the denoising of GM-APD lidar range images when SBRs are low. [ABSTRACT FROM AUTHOR]

Published

2023

41. Global Stability of Fractional Order HIV/AIDS Epidemic Model under Caputo Operator and Its Computational Modeling.

Author

Ahmad, Ashfaq, Ali, Rashid, Ahmad, Ijaz, Awwad, Fuad A., and Ismail, Emad A. A.

Subjects

HIV, AIDS, COMPUTATIONAL neuroscience, FIXED point theory, ORDINARY differential equations, DIFFERENTIAL operators, EPIDEMICS

Abstract

The human immunodeficiency virus (HIV) causes acquired immunodeficiency syndrome (AIDS), which is a chronic and sometimes fatal illness. HIV reduces an individual's capability against infection and illness by demolishing his or her immunity. This paper presents a new model that governs the dynamical behavior of HIV/AIDS by integrating new compartments, i.e., the treatment class T. The steady-state solutions of the model are investigated, and accordingly, the threshold quantity R 0 is calculated, which describes the global dynamics of the proposed model. It is proved that for R 0 less than one, the infection-free state of the model is globally asymptotically stable. However, as the threshold number increases by one, the endemic equilibrium becomes globally asymptotically stable, and in such case, the disease-free state is unstable. At the end of the paper, the analytic conclusions obtained from the analysis of the ordinary differential equation (ODE) model are supported through numerical simulations. The paper also addresses a comprehensive analysis of a fractional-order HIV model utilizing the Caputo fractional differential operator. The model's qualitative analysis is investigated, and computational modeling is used to examine the system's long-term behavior. The existence/uniqueness of the solution to the model is determined by applying some results from the fixed points of the theory. The stability results for the system are established by incorporating the Ulam–Hyers method. For numerical treatment and simulations, we apply Newton's polynomial and the Toufik–Atangana numerical method. Results demonstrate the effectiveness of the fractional-order approach in capturing the dynamics of the HIV/AIDS epidemic and provide valuable insights for designing effective control strategies. [ABSTRACT FROM AUTHOR]

Published

2023

42. Positive solution for a class of nonlinear fourth-order boundary value problem.

Author

Yanhong Zhang and Li Chen

Subjects

BOUNDARY value problems, FIXED point theory, DIFFERENTIAL operators, EXISTENCE theorems, PROOF theory

Abstract

In this paper, we are concerned with the existence of positive solutions for boundary value problems of nonlinear fourth-order differential equations *** where a(x) may change signs. The proof of main results is based on Leray-Schauder's fixed point theorem and the properties of Green's function of the fourth-order differential operator Lcu = u(4) + c(x)u. [ABSTRACT FROM AUTHOR]

Published

2023

43. NONOSCILLATION OF DAMPED LINEAR DIFFERENTIAL EQUATIONS WITH A PROPORTIONAL DERIVATIVE CONTROLLER AND ITS APPLICATION TO WHITTAKER–HILL-TYPE AND MATHIEU-TYPE EQUATIONS.

Author

Kazuki Ishibashi

Subjects

DIFFERENTIAL equations, DIFFERENTIAL operators, OPERATOR equations, EQUATIONS, MATHIEU equation, LINEAR differential equations

Abstract

The proportional derivative (PD) controller of a differential operator is commonly referred to as the conformable derivative. In this paper, we derive a nonoscillation theorem for damped linear differential equations with a differential operator using the conformable derivative of control theory. The proof of the nonoscillation theorem utilizes the Riccati inequality corresponding to the equation considered. The provided nonoscillation theorem gives the nonoscillatory condition for a damped Euler-type differential equation with a PD controller. Moreover, the nonoscillation of the equation with a PD controller that can generalize Whittaker–Hill-type equations is also considered in this paper. The Whittaker–Hill-type equation considered in this study also includes the Mathieu-type equation. As a subtopic of this work, we consider the nonoscillation of Mathieu-type equations with a PD controller while making full use of numerical simulations. [ABSTRACT FROM AUTHOR]

Published

2023

44. Scattering properties of the nonlinear eigenvalue‐dependent Sturm‐Liouville equations with sign‐alternating weight and jump condition.

Author

Coskun, Nimet

Subjects

*STURM-Liouville equation, *DIFFERENTIAL operators, *RESOLVENTS (Mathematics), *SCATTERING (Mathematics)

Abstract

This paper aims to investigate the scattering function and discrete spectrum of the impulsive Sturm‐Liouville type differential operator with a turning point and nonlinear eigenparameter‐dependent boundary condition. Using hyperbolic type representations of the fundamental solutions, the operator's discrete spectrum was constructed. We presented asymptotic equations for the fundamental solutions and the Jost function. Finally, we stated an example to demonstrate the paper's major points. [ABSTRACT FROM AUTHOR]

Published

2024

45. On local geometric properties of a tokamak equilibrium.

Author

Sun, Youwen

Subjects

TOKAMAKS, PLASMA physics, PLASMA equilibrium, DIFFERENTIAL operators, ORTHOGONAL functions

Abstract

To separate the complexities in plasma physics and geometric effects, compact formulas for local geometric properties of a tokamak equilibrium are presented in this paper. They are written in a form similar to the Frenet formulas. All of the geometric quantities are expressed in terms of curvature and torsion of the three spatial curves for the moving local frame of reference, i.e., local orthogonal vector basis. In this representation, the local magnetic shear and the normalized parallel current are just the differences between two torsions of the vector basis. All of the geometric properties are coordinate invariants and form a prime set of quantities for describing tokamak plasma equilibrium. This prime set can be evaluated in both flux coordinates with closed flux surfaces and cylindrical coordinates including areas with open field lines, which may allow the extension of some analysis on the open field lines outside the last closed surface. Fundamental differential operators for stability and transport studies can be expressed explicitly in terms of these geometric properties. It can also be used to simplify analytic studies. [ABSTRACT FROM AUTHOR]

Published

2024

46. Construction of Fractional Pseudospectral Differentiation Matrices with Applications.

Author

Li, Wenbin, Ma, Hongjun, and Zhao, Tinggang

Subjects

PARTIAL differential equations, ORDINARY differential equations, ORTHOGONAL polynomials, JACOBI polynomials, DIFFERENTIAL operators, COLLOCATION methods

Abstract

Differentiation matrices are an important tool in the implementation of the spectral collocation method to solve various types of problems involving differential operators. Fractional differentiation of Jacobi orthogonal polynomials can be expressed explicitly through Jacobi–Jacobi transformations between two indexes. In the current paper, an algorithm is presented to construct a fractional differentiation matrix with a matrix representation for Riemann–Liouville, Caputo and Riesz derivatives, which makes the computation stable and efficient. Applications of the fractional differentiation matrix with the spectral collocation method to various problems, including fractional eigenvalue problems and fractional ordinary and partial differential equations, are presented to show the effectiveness of the presented method. [ABSTRACT FROM AUTHOR]

Published

2024

47. Dynamic Analysis and Field-Programmable Gate Array Implementation of a 5D Fractional-Order Memristive Hyperchaotic System with Multiple Coexisting Attractors.

Author

Yu, Fei, Zhang, Wuxiong, Xiao, Xiaoli, Yao, Wei, Cai, Shuo, Zhang, Jin, Wang, Chunhua, and Li, Yi

Subjects

GATE array circuits, DIFFERENTIAL operators, LYAPUNOV exponents, MAGNETIC control, ATTRACTORS (Mathematics), PHASE diagrams

Abstract

On the basis of the chaotic system proposed by Wang et al. in 2023, this paper constructs a 5D fractional-order memristive hyperchaotic system (FOMHS) with multiple coexisting attractors through coupling of magnetic control memristors and dimension expansion. Firstly, the divergence, Kaplan–Yorke dimension, and equilibrium stability of the chaotic model are studied. Subsequently, we explore the construction of the 5D FOMHS, introducing the definitions of the Caputo differential operator and the Riemann–Liouville integral operator and employing the Adomian resolving approach to decompose the linears, the nonlinears, and the constants of the system. The complex dynamic characteristics of the system are analyzed by phase diagrams, Lyapunov exponent spectra, time-domain diagrams, etc. Finally, the hardware circuit of the proposed 5D FOMHS is performed by FPGA, and its randomness is verified using the NIST tool. [ABSTRACT FROM AUTHOR]

Published

2024

48. NEW MIXED RECURRENCE RELATIONS OF TWO-VARIABLE ORTHOGONAL POLYNOMIALS VIA DIFFERENTIAL OPERATORS.

Author

MAKKY, MOSAED M. and SHADAB, MOHAMMAD

Subjects

DIFFERENTIAL operators, JACOBI polynomials, ORTHOGONAL polynomials, HERMITE polynomials, POLYNOMIALS

Abstract

. In this paper, we derive new recurrence relations for two-variable orthogonal polynomials for example Jacobi polynomial, Batemans polynomial and Legendre polynomial via two different differential operators. We also derive some special cases of our main results. [ABSTRACT FROM AUTHOR]

Published

2024

49. Periodic solutions for nonlinear systems of Ode's with generalized variable exponents operators.

Author

García-Huidobro, M., Manásevich, R., Mawhin, J., and Tanaka, S.

Subjects

*PARTIAL differential operators, *BOUNDARY value problems, *PARTIAL differential equations, *ORDINARY differential equations, *DIFFERENTIAL operators

Abstract

Ordinary and partial differential equations with operators containing the p -Laplace operator, the so called ϕ -Laplace operator, operators with variable exponents and the double phase operators have been studied thoroughly for at least the last 20 years and the amount of papers dealing with these subjects is huge. In this paper we deal with the problem of the existence of periodic solutions to some system of ODE's involving a fairly general operator generalizing in this form corresponding results for the areas of research just mentioned. In our results neither the function generating the differential operator nor the right hand side function in the boundary value problem considered are necessarily equal to the gradient of a function. Our main result is a here is a continuation theorem based on the Leray-Schauder degree theory which allows us to obtain the existence of solutions for the boundary value problem considered. [ABSTRACT FROM AUTHOR]

Published

2024

50. Generalized Krätzel functions: an analytic study.

Author

Kabeer, Ashik A. and Kumar, Dilip

Subjects

*ANALYTIC functions, *DIFFERENTIAL operators, *LIPSCHITZ continuity, *OPERATOR functions, *INTEGRAL operators, *ZETA functions

Abstract

The paper is devoted to the study of generalized Krätzel functions, which are the kernel functions of type-1 and type-2 pathway transforms. Various analytical properties such as Lipschitz continuity, fixed point property and integrability of these functions are investigated. Furthermore, the paper introduces two new inequalities associated with generalized Krätzel functions. The composition formulae for various fractional operators, such as Grünwald-Letnikov fractional differential operator, Riemann-Liouville fractional integral and differential operators with these functions are also obtained. Additionally, it has been demonstrated that these kernel functions are related to the Heaviside step function, the Dirac delta function, and the Riemann zeta function. A computable series representation of the kernel function is also obtained. Further scope of the work is pointed out by modifying the kernel function with the Mittag-Leffler function. [ABSTRACT FROM AUTHOR]

Published

2024