Showing total 336 results

1. The Four-Parameter PSS Method for Solving the Sylvester Equation

Author

Yan-Ran Li, Xin-Hui Shao, and Hai-Long Shen

Subjects

Iterative method, General Mathematics, lcsh:Mathematics, Positive and skew-Hermitian iterative method, Value (computer science), 020206 networking & telecommunications, 010103 numerical & computational mathematics, 02 engineering and technology, Paper based, lcsh:QA1-939, 01 natural sciences, TheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGES, Sylvester equation, FPPSS iterative method, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Applied mathematics, Order (group theory), Computer Science::Programming Languages, 0101 mathematics, Coefficient matrix, Engineering (miscellaneous), Mathematics

Abstract

In order to solve the Sylvester equations more efficiently, a new four parameters positive and skew-Hermitian splitting (FPPSS) iterative method is proposed in this paper based on the previous research of the positive and skew-Hermitian splitting (PSS) iterative method. We prove that when coefficient matrix A and B satisfy certain conditions, the FPPSS iterative method is convergent in the parameter&rsquo, s value region. The numerical experiment results show that compared with previous iterative method, the FPPSS iterative method is more effective in terms of iteration number IT and runtime.

Published

2019

2. Methods for Constructing Complex Solutions of Nonlinear PDEs Using Simpler Solutions

Author

Andrei D. Polyanin and A. V. Aksenov

Subjects

Complex differential equation, General Mathematics, exact solutions, Computer Science::Digital Libraries, 01 natural sciences, 010305 fluids & plasmas, functional-differential equations, Simple (abstract algebra), reaction–diffusion equations, 0103 physical sciences, Reaction–diffusion system, Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, pantograph-type PDEs, Engineering (miscellaneous), Mathematics, PDEs with constant and variable delay, Partial differential equation, lcsh:Mathematics, 010102 general mathematics, Equations of motion, Function (mathematics), lcsh:QA1-939, Nonlinear system, nonlinear PDEs, Computer Science::Programming Languages, Heat equation, wave type equations

Abstract

This paper describes a number of simple but quite effective methods for constructing exact solutions of nonlinear partial differential equations that involve a relatively small amount of intermediate calculations. The methods employ two main ideas: (i) simple exact solutions can serve to construct more complex solutions of the equations under consideration and (ii) exact solutions of some equations can serve to construct solutions of other, more complex equations. In particular, we propose a method for constructing complex solutions from simple solutions using translation and scaling. We show that in some cases, rather complex solutions can be obtained by adding one or more terms to simpler solutions. There are situations where nonlinear superposition allows us to construct a complex composite solution using similar simple solutions. We also propose a few methods for constructing complex exact solutions to linear and nonlinear PDEs by introducing complex-valued parameters into simpler solutions. The effectiveness of the methods is illustrated by a large number of specific examples (over 30 in total). These include nonlinear heat equations, reaction–diffusion equations, wave type equations, Klein–Gordon type equations, equations of motion through porous media, hydrodynamic boundary layer equations, equations of motion of a liquid film, equations of gas dynamics, Navier–Stokes equations, and some other PDEs. Apart from exact solutions to `ordinary’ partial differential equations, we also describe some exact solutions to more complex nonlinear delay PDEs. Along with the unknown function at the current time, u=u(x,t), these equations contain the same function at a past time, w=u(x,t−τ), where τ&gt, 0 is the delay time. Furthermore, we look at nonlinear partial functional-differential equations of the pantograph type, which, in addition to the unknown u=u(x,t), also contain the same functions with dilated or contracted arguments, w=u(px,qt), where p and q are scaling parameters. We propose an efficient approach to construct exact solutions to such functional-differential equations. Some new exact solutions of nonlinear pantograph-type PDEs are presented. The methods and examples in this paper are presented according to the principle “from simple to complex”.

Published

2021

3. A Numerical Method for the Solution of the Two-Phase Fractional Lamé–Clapeyron–Stefan Problem

Author

Marek Błasik

Subjects

Discretization, Iterative method, General Mathematics, moving boundary problems, Boundary (topology), 02 engineering and technology, 01 natural sciences, 0203 mechanical engineering, stefan problems, Computer Science (miscellaneous), Applied mathematics, Boundary value problem, 0101 mathematics, fractional derivatives and integrals, Engineering (miscellaneous), Mathematics, Partial differential equation, Numerical analysis, lcsh:Mathematics, Stefan problem, phase changes, numerical method, lcsh:QA1-939, 010101 applied mathematics, 020303 mechanical engineering & transports, Time derivative

Abstract

In this paper, we present a numerical solution of a two-phase fractional Stefan problem with time derivative described in the Caputo sense. In the proposed algorithm, we use a special case of front-fixing method supplemented by the iterative procedure, which allows us to determine the position of the moving boundary. The presented method is an extension of a front-fixing method for the one-phase problem to the two-phase case. The novelty of the method is a new discretization of the partial differential equation dedicated to the second phase, which is carried out by introducing a new spatial variable immobilizing the moving boundary. Then, the partial differential equation is transformed to an equivalent integro-differential equation, which is discretized on a homogeneous mesh of nodes with a constant spatial and time step. A new convergence criterion is also proposed in the iterative algorithm determining the location of the moving boundary. The motivation for the development of the method is that the analytical solution of the considered problem is impossible to calculate in some cases, as can be seen in the figures in the paper. Moreover, the change of the boundary conditions makes obtaining a closed analytical solution very problematic. Therefore, creating new numerical methods is very valuable. In the final part, we also present some examples illustrating the comparison of the analytical solution with the results received by the proposed numerical method.

Published

2020

4. On an Inequality for Legendre Polynomials

Author

Ioan Ţincu and Florin Sofonea

Subjects

Inequality, lcsh:Mathematics, General Mathematics, media_common.quotation_subject, 010102 general mathematics, Gegenbauer, lcsh:QA1-939, Legendre, 01 natural sciences, Chebyshev filter, Upper and lower bounds, 010101 applied mathematics, Chebyshev, Orthogonal polynomials, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, Computer Science (miscellaneous), Probability distribution, Order (group theory), Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Legendre polynomials, hypergeometric representation, media_common, Mathematics

Abstract

This paper is concerned with the orthogonal polynomials. Upper and lower bounds of Legendre polynomials are obtained. Furthermore, entropies associated with discrete probability distributions is a topic considered in this paper. Bounds of the entropies which improve some previously known results are obtained in terms of inequalities. In order to illustrate the results obtained in this paper and to compare them with other results from the literature some graphs are provided.

Published

2020

5. On Optimal and Asymptotic Properties of a Fuzzy L2 Estimator

Author

Przemysław Grzegorzewski and Jin Hee Yoon

Subjects

0209 industrial biotechnology, Mathematics::General Mathematics, fuzzy random variable, General Mathematics, asymptotic normality, Asymptotic distribution, 02 engineering and technology, Best linear unbiased prediction, Fuzzy logic, 020901 industrial engineering & automation, BLUE, Bias of an estimator, triangular fuzzy matrix, fuzzy least squares estimator, unbiased estimator, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Fuzzy number, Applied mathematics, Engineering (miscellaneous), Mathematics, consistency, lcsh:Mathematics, Strong consistency, Estimator, lcsh:QA1-939, Efficiency, ComputingMethodologies_PATTERNRECOGNITION, fuzzy-type linear estimator, 020201 artificial intelligence & image processing, ComputingMethodologies_GENERAL

Abstract

A fuzzy least squares estimator in the multiple with fuzzy-input&ndash, fuzzy-output linear regression model is considered. The paper provides a formula for the L2 estimator of the fuzzy regression model. This paper proposes several operations for fuzzy numbers and fuzzy matrices with fuzzy components and discussed some algebraic properties that are needed to use for proving theorems. Using the proposed operations, the formula for the variance, provided and this paper, proves that the estimators have several important optimal properties and asymptotic properties: they are Best Linear Unbiased Estimator (BLUE), asymptotic normality and strong consistency. The confidence regions of the coefficient parameters and the asymptotic relative efficiency (ARE) are also discussed. In addition, several examples are provided including a Monte Carlo simulation study showing the validity of the proposed theorems.

Published

2020

6. A Least Squares Differential Quadrature Method for a Class of Nonlinear Partial Differential Equations of Fractional Order

Author

Constantin Bota, Dumitru Ţucu, Bogdan Căruntu, Marioara Lăpădat, and Mădălina Sofia Paşca

Subjects

Polynomial, Partial differential equation, General Mathematics, lcsh:Mathematics, fractional differential equations, 02 engineering and technology, lcsh:QA1-939, 01 natural sciences, Least squares, analytical approximate solution, Fractional calculus, nonlinear partial differential equations, 010101 applied mathematics, Nonlinear system, Exact solutions in general relativity, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Applied mathematics, Nyström method, 020201 artificial intelligence & image processing, 0101 mathematics, Engineering (miscellaneous), Differential (mathematics), differential quadrature method, Mathematics

Abstract

In this paper a new method called the least squares differential quadrature method (LSDQM) is introduced as a straightforward and efficient method to compute analytical approximate polynomial solutions for nonlinear partial differential equations with fractional time derivatives. LSDQM is a combination of the differential quadrature method and the least squares method and in this paper it is employed to find approximate solutions for a very general class of nonlinear partial differential equations, wherein the fractional derivatives are described in the Caputo sense. The paper contains a clear, step-by-step presentation of the method and a convergence theorem. In order to emphasize the accuracy of LSDQM we included two test problems previously solved by means of other, well-known methods, and observed that our solutions present not only a smaller error but also a much simpler expression. We also included a problem with no known exact solution and the solutions computed by LSDQM are in good agreement with previous ones.

Published

2020

7. Oscillatory Behavior of a Type of Generalized Proportional Fractional Differential Equations with Forcing and Damping Terms

Author

Velu Muthulakshmi, Jehad Alzabut, James Viji, and Weerawat Sudsutad

Subjects

Forcing (recursion theory), damping and forcing terms, Oscillation, General Mathematics, lcsh:Mathematics, 010102 general mathematics, lcsh:QA1-939, 01 natural sciences, 010101 applied mathematics, generalized proportional fractional operator, nonoscillatory behavior, Computer Science (miscellaneous), Applied mathematics, oscillation criteria, 0101 mathematics, Fractional differential, Engineering (miscellaneous), Mathematics

Abstract

In this paper, we study the oscillatory behavior of solutions for a type of generalized proportional fractional differential equations with forcing and damping terms. Several oscillation criteria are established for the proposed equations in terms of Riemann-Liouville and Caputo settings. The results of this paper generalize some existing theorems in the literature. Indeed, it is shown that for particular choices of parameters, the obtained conditions in this paper reduce our theorems to some known results. Numerical examples are constructed to demonstrate the effectiveness of the our main theorems. Furthermore, we present and illustrate an example which does not satisfy the assumptions of our theorem and whose solution demonstrates nonoscillatory behavior.

Published

2020

8. The Four-Parameters Wright Function of the Second kind and its Applications in FC

Author

Yuri Luchko

Subjects

Subordination (linguistics), Diffusion equation, subordination formula, General Mathematics, lcsh:Mathematics, 010102 general mathematics, Spectrum (functional analysis), scale-invariant solutions, Wright Omega function, left- and right-hand sided Erdélyi-Kober fractional derivatives, lcsh:QA1-939, 01 natural sciences, Fractional calculus, 010101 applied mathematics, one-dimensional time-fractional diffusion-wave equation, Operational calculus, Kernel (statistics), Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Special case, Engineering (miscellaneous), Mathematics, four-parameters Wright function of the second kind, multi-dimensional space-time-fractional diffusion equation

Abstract

In this survey paper, we present both some basic properties of the four-parameters Wright function and its applications in Fractional Calculus. For applications in Fractional Calculus, the four-parameters Wright function of the second kind is especially important. In the paper, three case studies illustrating a wide spectrum of its applications are presented. The first case study deals with the scale-invariant solutions to a one-dimensional time-fractional diffusion-wave equation that can be represented in terms of the Wright function of the second kind and the four-parameters Wright function of the second kind. In the second case study, we consider a subordination formula for the solutions to a multi-dimensional space-time-fractional diffusion equation with different orders of the fractional derivatives. The kernel of the subordination integral is a special case of the four-parameters Wright function of the second kind. Finally, in the third case study, we shortly present an application of an operational calculus for a composed Erdélyi-Kober fractional operator for solving some initial-value problems for the fractional differential equations with the left- and right-hand sided Erdélyi-Kober fractional derivatives. In particular, we present an example with an explicit solution in terms of the four-parameters Wright function of the second kind.

Published

2020

9. Modified Halpern Iterative Method for Solving Hierarchical Problem and Split Combination of Variational Inclusion Problem in Hilbert Space

Author

Atid Kangtunyakarn and Bunyawee Chaloemyotphong

Subjects

021103 operations research, Iterative method, fixed point problem, General Mathematics, split variational inclusion problem, lcsh:Mathematics, 0211 other engineering and technologies, Hilbert space, Zero-point energy, 02 engineering and technology, lcsh:QA1-939, 01 natural sciences, hierarchical fixed point problem, 010101 applied mathematics, symbols.namesake, Fixed point problem, Convergence (routing), Computer Science (miscellaneous), symbols, Applied mathematics, Inequality problem, 0101 mathematics, Engineering (miscellaneous), Mathematics

Abstract

The purpose of this paper is to introduce the split combination of variational inclusion problem which combines the concept of the modified variational inclusion problem introduced by Khuangsatung and Kangtunyakarn and the split variational inclusion problem introduced by Moudafi. Using a modified Halpern iterative method, we prove the strong convergence theorem for finding a common solution for the hierarchical fixed point problem and the split combination of variational inclusion problem. The result presented in this paper demonstrates the corresponding result for the split zero point problem and the split combination of variation inequality problem. Moreover, we discuss a numerical example for supporting our result and the numerical example shows that our result is not true if some conditions fail.

Published

2019

10. Global Behavior of a Higher Order Fuzzy Difference Equation

Author

Bin Qin, Taixiang Sun, and Guangwang Su

Subjects

0209 industrial biotechnology, fuzzy number, Differential equation, General Mathematics, lcsh:Mathematics, 02 engineering and technology, lcsh:QA1-939, Fuzzy logic, fuzzy difference equation, positive solution, positive equilibrium, 020901 industrial engineering & automation, Convergence (routing), 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Fuzzy number, Order (group theory), Applied mathematics, 020201 artificial intelligence & image processing, Positive equilibrium, Engineering (miscellaneous), Mathematics

Abstract

Our aim in this paper is to investigate the convergence behavior of the positive solutions of a higher order fuzzy difference equation and show that all positive solutions of this equation converge to its unique positive equilibrium under appropriate assumptions. Furthermore, we give two examples to account for the applicability of the main result of this paper.

Published

2019

11. New Robust Cross-Variogram Estimators and Approximations of Their Distributions Based on Saddlepoint Techniques

Author

Alfonso García-Pérez

Subjects

Multivariate statistics, lcsh:Mathematics, General Mathematics, 010102 general mathematics, Estimator, Sample (statistics), robustness, lcsh:QA1-939, 01 natural sciences, Measure (mathematics), saddlepoint approximations, 010104 statistics & probability, Robustness (computer science), spatial data, Computer Science (miscellaneous), Statistics::Methodology, Applied mathematics, 0101 mathematics, Spatial dependence, Engineering (miscellaneous), Spatial analysis, Independence (probability theory), Mathematics

Abstract

Let Z(s)=(Z1(s),…,Zp(s))t be an isotropic second-order stationary multivariate spatial process. We measure the statistical association between the p random components of Z with the correlation coefficients and measure the spatial dependence with variograms. If two of the Z components are correlated, the spatial information provided by one of them can improve the information of the other. To capture this association, both within components of Z(s) and across s, we use a cross-variogram. Only two robust cross-variogram estimators have been proposed in the literature, both by Lark, and their sample distributions were not obtained. In this paper, we propose new robust cross-variogram estimators, following the location estimation method instead of the scale estimation one considered by Lark, thus extending the results obtained by García-Pérez to the multivariate case. We also obtain accurate approximations for their sample distributions using saddlepoint techniques and assuming a multivariate-scale contaminated normal model. The question of the independence of the transformed variables to avoid the usual dependence of spatial observations is also considered in the paper, linking it with the acceptance of linear variograms and cross-variograms.

Published

2021

12. A Concretization of an Approximation Method for Non-Affine Fractal Interpolation Functions

Author

Alexandra Baicoianu, Cristina Maria Păcurar, and Marius Paun

Subjects

General Mathematics, Computation, Context (language use), countable deterministic non-linear scheme, 01 natural sciences, 010305 fluids & plasmas, Fractal, 0103 physical sciences, Attractor, countable affine probabilistic scheme, Computer Science (miscellaneous), Countable set, Applied mathematics, 0101 mathematics, countable affine deterministic scheme, Engineering (miscellaneous), Finite set, Mathematics, countable non-linear probabilistic scheme, lcsh:Mathematics, 010102 general mathematics, fractal interpolation function, lcsh:QA1-939, non-affine FIFs, Affine transformation, Interpolation

Abstract

The present paper concretizes the models proposed by S. Ri and N. Secelean. S. Ri proposed the construction of the fractal interpolation function (FIF) considering finite systems consisting of Rakotch contractions, but produced no concretization of the model. N. Secelean considered countable systems of Banach contractions to produce the fractal interpolation function. Based on the abovementioned results, in this paper, we propose two different algorithms to produce the fractal interpolation functions both in the affine and non-affine cases. The theoretical context we were working in suppose a countable set of starting points and a countable system of Rakotch contractions. Due to the computational restrictions, the algorithms constructed in the applications have the weakness that they use a finite set of starting points and a finite system of Rakotch contractions. In this respect, the attractor obtained is a two-step approximation. The large number of points used in the computations and the graphical results lead us to the conclusion that the attractor obtained is a good approximation of the fractal interpolation function in both cases, affine and non-affine FIFs. In this way, we also provide a concretization of the scheme presented by C.M. Păcurar.

Published

2021

13. An Optimal Eighth-Order Family of Iterative Methods for Multiple Roots

Author

Fiza Zafar, Saima Akram, and Nusrat Yasmin

Subjects

Weight function, 010304 chemical physics, Iterative method, General Mathematics, multiple roots, lcsh:Mathematics, Multiplicity (mathematics), 010103 numerical & computational mathematics, lcsh:QA1-939, 01 natural sciences, Computer Science::Digital Libraries, efficiency index, Nonlinear system, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, 0103 physical sciences, Computer Science (miscellaneous), nonlinear equations, Applied mathematics, Computer Science::Programming Languages, 0101 mathematics, optimal iterative methods, Engineering (miscellaneous), Root-finding algorithm, Mathematics

Abstract

In this paper, we introduce a new family of efficient and optimal iterative methods for finding multiple roots of nonlinear equations with known multiplicity ( m &ge, 1 ) . We use the weight function approach involving one and two parameters to develop the new family. A comprehensive convergence analysis is studied to demonstrate the optimal eighth-order convergence of the suggested scheme. Finally, numerical and dynamical tests are presented, which validates the theoretical results formulated in this paper and illustrates that the suggested family is efficient among the domain of multiple root finding methods.

Published

2019

14. Numerical Solution of the Boundary Value Problems Arising in Magnetic Fields and Cylindrical Shells

Author

Maysaa Al-Qurashi, Abdul Ghaffar, Kottakkaran Sooppy Nisar, Muhammad Nawaz Naeem, Dumitru Baleanu, Zafar Ullah, and Aasma Khalid

Subjects

Timoshenko beam theory, system of linear algebraic equations, boundary value problems, General Mathematics, cubic B-spline, 010103 numerical & computational mathematics, central finite difference approximations, System of linear equations, 01 natural sciences, absolute error, Approximation error, Computer Science (miscellaneous), Fluid dynamics, Applied mathematics, 8th order, Boundary value problem, 0101 mathematics, Engineering (miscellaneous), Mathematics, numerical solution, lcsh:Mathematics, Boundary problem, lcsh:QA1-939, 010101 applied mathematics, Spline (mathematics), Exact solutions in general relativity

Abstract

This paper is devoted to the study of the Cubic B-splines to find the numerical solution of linear and non-linear 8th order BVPs that arises in the study of astrophysics, magnetic fields, astronomy, beam theory, cylindrical shells, hydrodynamics and hydro-magnetic stability, engineering, applied physics, fluid dynamics, and applied mathematics. The recommended method transforms the boundary problem to a system of linear equations. The algorithm we are going to develop in this paper is not only simply the approximation solution of the 8th order BVPs using Cubic-B spline but it also describes the estimated derivatives of 1st order to 8th order of the analytic solution. The strategy is effectively applied to numerical examples and the outcomes are compared with the existing results. The method proposed in this paper provides better approximations to the exact solution.

Published

2019

15. Complex Dynamical Behaviors of Lorenz-Stenflo Equations

Author

Min Xiao and Fuchen Zhang

Subjects

Lyapunov function, Series (mathematics), General Mathematics, lcsh:Mathematics, Chaos model, lcsh:QA1-939, 01 natural sciences, Synchronization, Domain (mathematical analysis), 010305 fluids & plasmas, CHAOS (operating system), Nonlinear Sciences::Chaotic Dynamics, Nonlinear system, symbols.namesake, nonlinear dynamics, generalized Lyapunov function, Bounded function, 0103 physical sciences, Computer Science (miscellaneous), symbols, Lorenz-Stenflo system, Applied mathematics, 010301 acoustics, Engineering (miscellaneous), Mathematics

Abstract

A mathematical chaos model for the dynamical behaviors of atmospheric acoustic-gravity waves is considered in this paper. Boundedness and globally attractive sets of this chaos model are studied by means of the generalized Lyapunov function method. The innovation of this paper is that it not only proves this system is globally bounded but also provides a series of global attraction sets of this system. The rate of trajectories entering from the exterior of the trapping domain to its interior is also obtained. Finally, the detailed numerical simulations are carried out to justify theoretical results. The results in this study can be used to study chaos control and chaos synchronization of this chaos system.

Published

2019

16. The Generalized Viscosity Implicit Midpoint Rule for Nonexpansive Mappings in Banach Space

Author

Yunhua Qu, Huancheng Zhang, and Yongfu Su

Subjects

Banach space, General Mathematics, lcsh:Mathematics, Field (mathematics), generalized viscosity implicit midpoint rule, 010103 numerical & computational mathematics, nonexpansive mapping, lcsh:QA1-939, 01 natural sciences, 010101 applied mathematics, strong convergence, Viscosity (programming), Convergence (routing), Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Midpoint method, Engineering (miscellaneous), Mathematics

Abstract

This paper constructs the generalized viscosity implicit midpoint rule for nonexpansive mappings in Banach space. It obtains strong convergence conclusions for the proposed algorithm and promotes the related results in this field. Moreover, this paper gives some applications. Finally, the paper gives six numerical examples to support the main results.

Published

2019

17. Comparison of the Effectiveness of Different Methods for Constructing Exact Solutions to Nonlinear PDEs. Generalizations and New Solutions

Author

Andrei D. Polyanin

Subjects

Generalization, functional separation of variables, General Mathematics, Separation of variables, exact solutions, 01 natural sciences, 010305 fluids & plasmas, Separable space, symbols.namesake, differential constraints, 0103 physical sciences, Computer Science (miscellaneous), Applied mathematics, Clarkson–Kruskal direct method, 010301 acoustics, Engineering (miscellaneous), Mathematics, nonlinear Klein–Gordon equations, Direct method, lcsh:Mathematics, nonclassical method, invariant surface condition, lcsh:QA1-939, Nonlinear system, Boundary layer, symmetry reductions, Schrödinger type equations, symbols, Schrödinger's cat, boundary layer equations

Abstract

The paper shows that, in looking for exact solutions to nonlinear PDEs, the direct method of functional separation of variables can, in certain cases, be more effective than the method of differential constraints based on the compatibility analysis of PDEs with a single constraint (or the nonclassical method of symmetry reductions based on an invariant surface condition). This fact is illustrated by examples of nonlinear reaction-diffusion and convection-diffusion equations with variable coefficients, and nonlinear Klein&ndash, Gordon-type equations. Hydrodynamic boundary layer equations, nonlinear Schr&ouml, dinger type equations, and a few third-order PDEs are also investigated. Several new exact functional separable solutions are given. A possibility of increasing the efficiency of the Clarkson&ndash, Kruskal direct method is discussed. A generalization of the direct method of the functional separation of variables is also described. Note that all nonlinear PDEs considered in the paper include one or several arbitrary functions.

Published

2019

18. The Solution of Backward Heat Conduction Problem with Piecewise Linear Heat Transfer Coefficient

Author

Huaxi (Yulin) Zhang, Yang Yu, Qingxin Zhang, and Xiaochuan Luo

Subjects

General Mathematics, Inverse, Improved method, truncated regularized optimization scheme, 02 engineering and technology, Heat transfer coefficient, Ill-posed problems, 01 natural sciences, Regularization (mathematics), heat transfer coefficient, Piecewise linear function, 0203 mechanical engineering, Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Mathematics, Computer simulation, lcsh:Mathematics, regularization parameters, Thermal conduction, lcsh:QA1-939, 010101 applied mathematics, Continuous casting, 020303 mechanical engineering & transports, backward heat conduction problem

Abstract

In the fields of continuous casting and the roll stepped cooling, the heat transfer coefficient is piecewise linear. However, few papers discuss the solution of the backward heat conduction problem in this situation. Therefore, the aim of this paper is to solve the backward heat conduction problem, which has the piecewise linear heat transfer coefficient. Firstly, the ill-posed of this problem is discussed and the truncated regularized optimization scheme is introduced to solve this problem. Secondly, because the regularization parameter is the key factor for the regularization method, this paper presents an improved method for choosing the regularization parameter to reduce the iterative number and proves the fourth-order convergence of this method. Furthermore, the numerical simulation experiments show that, compared with other methods, the improved method of fourth-order convergence effectively reduces the iterative number. Finally, the truncated regularized optimization scheme is used to estimate the initial temperature, and the results of numerical simulation experiments illustrate that the inverse values match the exact values very well.

Published

2019

19. Dynamics of the Almost Periodic Discrete Mackey–Glass Model

Author

Jehad Alzabut, Debaldev Jana, and Zhijian Yao

Subjects

Class (set theory), exponential convergence, Exponential convergence, lcsh:Mathematics, General Mathematics, 010102 general mathematics, Dynamics (mechanics), almost periodic solution, 010103 numerical & computational mathematics, lcsh:QA1-939, 01 natural sciences, contraction mapping principle, Mackey–Glass model, Lyapunov functional, Computer Science (miscellaneous), Applied mathematics, Contraction mapping, 0101 mathematics, Engineering (miscellaneous), Mathematics

Abstract

This paper is concerned with a class of the discrete Mackey–Glass model that describes the process of the production of blood cells. Prior to proceeding to the main results, we prove the boundedness and extinction of its solutions. By means of the contraction mapping principle and under appropriate assumptions, we prove the existence of almost periodic positive solutions. Furthermore and by the implementation of the discrete Lyapunov functional, sufficient conditions are established for the exponential convergence of the almost periodic positive solution. Examples, as well as numerical simulations are illustrated to demonstrate the effectiveness of the theoretical findings of the paper. Our results are new and generalize some previously-reported results in the literature.

Published

2018

20. Strong Convergence Theorems for Fixed Point Problems for Nonexpansive Mappings and Zero Point Problems for Accretive Operators Using Viscosity Implicit Midpoint Rules in Banach Spaces

Author

Yunhua Qu, Huancheng Zhang, and Yongfu Su

Subjects

zero point problem, 021103 operations research, lcsh:Mathematics, General Mathematics, 0211 other engineering and technologies, Banach space, Field (mathematics), viscosity implicit midpoint rule, 02 engineering and technology, Fixed point, lcsh:QA1-939, nonexpansive mapping, 01 natural sciences, Midpoint, 010101 applied mathematics, Operator (computer programming), Viscosity (programming), Convergence (routing), Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Midpoint method, Engineering (miscellaneous), accretive operator, Mathematics

Abstract

This paper uses the viscosity implicit midpoint rule to find common points of the fixed point set of a nonexpansive mapping and the zero point set of an accretive operator in Banach space. Under certain conditions, this paper obtains the strong convergence results of the proposed algorithm and improves the relevant results of researchers in this field. In the end, this paper gives numerical examples to support the main results.

Published

2018

21. A New Operational Matrix of Fractional Derivatives to Solve Systems of Fractional Differential Equations via Legendre Wavelets

Author

Selvi Altun and Aydin Secer

Subjects

0209 industrial biotechnology, Correctness, Legendre wavelet, General Mathematics, MathematicsofComputing_NUMERICALANALYSIS, 02 engineering and technology, 01 natural sciences, 010305 fluids & plasmas, 020901 industrial engineering & automation, Operational matrix, 0103 physical sciences, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, operational matrix, Computer Science (miscellaneous), Applied mathematics, Liouville_Caputo sense, Engineering (miscellaneous), Legendre polynomials, Mathematics, lcsh:Mathematics, systems of fractional order differential equations, lcsh:QA1-939, Fractional calculus, Algebraic equation, Fractional differential

Abstract

This paper introduces a new numerical approach to solving a system of fractional differential equations (FDEs) using the Legendre wavelet operational matrix method (LWOMM). We first formulated the operational matrix of fractional derivatives in some special conditions using some notable characteristics of Legendre wavelets and shifted Legendre polynomials. Then, the system of fractional differential equations was transformed into a system of algebraic equations by using these operational matrices. At the end of this paper, several examples are presented to illustrate the effectivity and correctness of the proposed approach. Comparing the methodology with several recognized methods demonstrates that the advantages of the Legendre wavelet operational matrix method are its accuracy and the understandability of the calculations.

Published

2018

22. Generalized Hurst Hypothesis: Description of Time-Series in Communication Systems

Author

Raoul R. Nigmatullin, Semyon Dorokhin, and Alexander Ivchenko

Subjects

Series (mathematics), Generalization, lcsh:Mathematics, General Mathematics, long-time series, Complex system, power-law hypothesis, lcsh:QA1-939, 01 natural sciences, Domain (mathematical analysis), hurst power-law exponent, Set (abstract data type), 03 medical and health sciences, 0302 clinical medicine, Approximation error, 0103 physical sciences, Computer Science (miscellaneous), Exponent, Applied mathematics, complex systems, Focus (optics), 010301 acoustics, Engineering (miscellaneous), 030217 neurology & neurosurgery, Mathematics

Abstract

In this paper, we focus on the generalization of the Hurst empirical law and suggest a set of reduced parameters for quantitative description of long-time series. These series are usually considered as a specific response of a complex system (economic, geophysical, electromagnetic and other systems), where successive fixations of external factors become impossible. We consider applying generalized Hurst laws to obtain a new set of reduced parameters in data associated with communication systems. We analyze three hypotheses. The first one contains one power-law exponent. The second one incorporates two power-law exponents, which are in many cases complex-conjugated. The third hypothesis has three power-law exponents, two of which are complex-conjugated as well. These hypotheses describe with acceptable accuracy (relative error does not exceed 2%) a wide set of trendless sequences (TLS) associated with radiometric measurements. Generalized Hurst laws operate with R/S curves not only in the asymptotic region, but in the entire domain. The fitting parameters can be used as the reduced parameters for the description of the given data. The paper demonstrates that this general approach can also be applied to other TLS.

Published

2021

23. Numerical Analysis for the Fractional Ambartsumian Equation via the Homotopy Herturbation Method

Author

Weam Alharbi and Sergei Petrovskii

Subjects

Power series, Mittag-Leffler function, lcsh:Mathematics, General Mathematics, Numerical analysis, Homotopy, fractional derivative, 010103 numerical & computational mathematics, lcsh:QA1-939, 01 natural sciences, Ambartsumian equation, Domain (mathematical analysis), Fractional calculus, 010101 applied mathematics, symbols.namesake, Convergence (routing), Computer Science (miscellaneous), symbols, Applied mathematics, 0101 mathematics, Homotopy perturbation method, homotopy perturbation method, Engineering (miscellaneous), Mathematics

Abstract

The fractional calculus is useful in describing the natural phenomena with memory effect. This paper addresses the fractional form of Ambartsumian equation with a delay parameter. It may be a challenge to obtain accurate approximate solution of such kinds of fractional delay equations. In the literature, several attempts have been conducted to analyze the fractional Ambartsumian equation. However, the previous approaches in the literature led to approximate power series solutions which converge in subdomains. Such difficulties are solved in this paper via the Homotopy Perturbation Method (HPM). The present approximations are expressed in terms of the Mittag-Leffler functions which converge in the whole domain of the studied model. The convergence issue is also addressed. Several comparisons with the previous published results are discussed. In particular, while the computed solution in the literature is physical in short domains, with our approach it is physical in the whole domain. The results reveal that the HPM is an effective tool to analyzing the fractional Ambartsumian equation.

Published

2020

24. Solutions of Sturm-Liouville Problems

Author

Christine Böckmann and Upeksha Perera

Subjects

Work (thermodynamics), General Mathematics, Mathematics::Classical Analysis and ODEs, inverse Sturm–Liouville problems, Inverse, Sturm–Liouville theory, 010103 numerical & computational mathematics, 01 natural sciences, Magnus expansion, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, Computer Science (miscellaneous), Applied mathematics, Order (group theory), Boundary value problem, ddc:510, 0101 mathematics, Engineering (miscellaneous), Mathematics, lcsh:Mathematics, Institut für Mathematik, Lie group, Mathematics::Spectral Theory, lcsh:QA1-939, 010101 applied mathematics, Sturm–Liouville problems of higher order, Noise, singular Sturm–Liouville problems

Abstract

This paper further improves the Lie group method with Magnus expansion proposed in a previous paper by the authors, to solve some types of direct singular Sturm&ndash, Liouville problems. Next, a concrete implementation to the inverse Sturm&ndash, Liouville problem algorithm proposed by Barcilon (1974) is provided. Furthermore, computational feasibility and applicability of this algorithm to solve inverse Sturm&ndash, Liouville problems of higher order (for n=2,4) are verified successfully. It is observed that the method is successful even in the presence of significant noise, provided that the assumptions of the algorithm are satisfied. In conclusion, this work provides a method that can be adapted successfully for solving a direct (regular/singular) or inverse Sturm&ndash, Liouville problem (SLP) of an arbitrary order with arbitrary boundary conditions.

Published

2020

25. Spurious OLS Estimators of Detrending Method by Adding a Linear Trend in Difference-Stationary Processes—A Mathematical Proof and Its Verification by Simulation

Author

Zhiming Long and Rémy Herrera

Subjects

detrending method, Stochastic process, lcsh:Mathematics, General Mathematics, 05 social sciences, Monte Carlo method, Estimator, lcsh:QA1-939, Mathematical proof, stochastic process, pseudo-randomness, spurious regressions, Chebyshev's inequality, 0502 economics and business, Ordinary least squares, Computer Science (miscellaneous), Applied mathematics, Chebyshev’s inequality, 050207 economics, Spurious relationship, Engineering (miscellaneous), Monte Carlo simulation, 050205 econometrics, Mathematics, Variable (mathematics)

Abstract

Adding a linear trend in regressions is a frequent detrending method in economic literatures. The traditional literatures pointed out that if the variable considered is a difference-stationary process, then it will artificially create pseudo-periodicity in the residuals. In this paper, we further show that the real problem might be more serious. As the Ordinary Least Squares (OLS) estimators themselves are of such a detrending method is spurious. The first part provides a mathematical proof with Chebyshev&rsquo, s inequality and Sims&ndash, Stock&ndash, Watson&rsquo, s algorithm to show that the OLS estimator of trend converges toward zero in probability, and the other OLS estimator diverges when the sample size tends to infinity. The second part designs Monte Carlo simulations with a sample size of 1,000,000 as an approximation of infinity. The seed values used are the true random numbers generated by a hardware random number generator in order to avoid the pseudo-randomness of random numbers given by software. This paper repeats the experiment 100 times, and gets consistent results with mathematical proof. The last part provides a brief discussion of detrending strategies.

Published

2020

26. Some Properties of Univariate and Multivariate Exponential Power Distributions and Related Topics

Author

Victor Korolev

Subjects

uniform distribution, Multivariate statistics, Uniform distribution (continuous), lcsh:Mathematics, General Mathematics, 010102 general mathematics, Generalized gamma distribution, Order statistic, Univariate, exponential power distribution, scale mixture, lcsh:QA1-939, generalized gamma distribution, 01 natural sciences, Stable distribution, 010104 statistics & probability, stable distribution, Computer Science (miscellaneous), Gamma distribution, Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Random variable, random sum, Mathematics

Abstract

In the paper, a survey of the main results concerning univariate and multivariate exponential power (EP) distributions is given, with main attention paid to mixture representations of these laws. The properties of mixing distributions are considered and some asymptotic results based on mixture representations for EP and related distributions are proved. Unlike the conventional analytical approach, here the presentation follows the lines of a kind of arithmetical approach in the space of random variables or vectors. Here the operation of scale mixing in the space of distributions is replaced with the operation of multiplication in the space of random vectors/variables under the assumption that the multipliers are independent. By doing so, the reasoning becomes much simpler, the proofs become shorter and some general features of the distributions under consideration become more vivid. The first part of the paper concerns the univariate case. Some known results are discussed and simple alternative proofs for some of them are presented as well as several new results concerning both EP distributions and some related topics including an extension of Gleser’s theorem on representability of the gamma distribution as a mixture of exponential laws and limit theorems on convergence of the distributions of maximum and minimum random sums to one-sided EP distributions and convergence of the distributions of extreme order statistics in samples with random sizes to the one-sided EP and gamma distributions. The results obtained here open the way to deal with natural multivariate analogs of EP distributions. In the second part of the paper, we discuss the conventionally defined multivariate EP distributions and introduce the notion of projective EP (PEP) distributions. The properties of multivariate EP and PEP distributions are considered as well as limit theorems establishing the conditions for the convergence of multivariate statistics constructed from samples with random sizes (including random sums of random vectors) to multivariate elliptically contoured EP and projective EP laws. The results obtained here give additional theoretical grounds for the applicability of EP and PEP distributions as asymptotic approximations for the statistical regularities observed in data in many fields.

Published

2020

27. General Decay Rate of Solution for Love-Equation with Past History and Absorption

Author

Mohamad Biomy and Khaled Zennir

Subjects

lcsh:Mathematics, General Mathematics, 010102 general mathematics, 010103 numerical & computational mathematics, Function (mathematics), Type (model theory), lcsh:QA1-939, nonlinear Love-equation, 01 natural sciences, Term (time), infinite memory, Nonlinear system, Love wave, general decay rate, Computer Science (miscellaneous), Applied mathematics, Boundary value problem, Relaxation (approximation), 0101 mathematics, Convex function, Engineering (miscellaneous), Mathematics

Abstract

In the present paper, we consider an important problem from the point of view of application in sciences and engineering, namely, a new class of nonlinear Love-equation with infinite memory in the presence of source term that takes general nonlinearity form. New minimal conditions on the relaxation function and the relationship between the weights of source term are used to show a very general decay rate for solution by certain properties of convex functions combined with some estimates. Investigations on the propagation of surface waves of Love-type have been made by many authors in different models and many attempts to solve Love&rsquo, s equation have been performed, in view of its wide applicability. To our knowledge, there are no decay results for damped equations of Love waves or Love type waves. However, the existence of solution or blow up results, with different boundary conditions, have been extensively studied by many authors. Our interest in this paper arose in the first place in consequence of a query for a new decay rate, which is related to those for infinite memory &piv, in the third section. We found that the system energy decreased according to a very general rate that includes all previous results.

Published

2020

28. Stochastic Memristive Quaternion-Valued Neural Networks with Time Delays: An Analysis on Mean Square Exponential Input-to-State Stability

Author

Usa Humphries, Pramet Kaewmesri, Chee Peng Lim, Pharunyou Chanthorn, Grienggrai Rajchakit, Rajendran Samidurai, and Ramalingam Sriraman

Subjects

0209 industrial biotechnology, Time delays, Artificial neural network, lcsh:Mathematics, General Mathematics, exponential input-to-state stability, Stability (learning theory), Order (ring theory), 02 engineering and technology, State (functional analysis), stochastic memristive quaternion-valued neural networks, lcsh:QA1-939, Exponential function, System model, Lyapunov fractional, 020901 industrial engineering & automation, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Applied mathematics, 020201 artificial intelligence & image processing, Quaternion, Engineering (miscellaneous), Mathematics

Abstract

In this paper, we study the mean-square exponential input-to-state stability (exp-ISS) problem for a new class of neural network (NN) models, i.e., continuous-time stochastic memristive quaternion-valued neural networks (SMQVNNs) with time delays. Firstly, in order to overcome the difficulties posed by non-commutative quaternion multiplication, we decompose the original SMQVNNs into four real-valued models. Secondly, by constructing suitable Lyapunov functional and applying It o ^ &rsquo, s formula, Dynkin&rsquo, s formula as well as inequity techniques, we prove that the considered system model is mean-square exp-ISS. In comparison with the conventional research on stability, we derive a new mean-square exp-ISS criterion for SMQVNNs. The results obtained in this paper are the general case of previously known results in complex and real fields. Finally, a numerical example has been provided to show the effectiveness of the obtained theoretical results.

Published

2020

29. Classical Lagrange Interpolation Based on General Nodal Systems at Perturbed Roots of Unity

Author

Alberto Castejón, Alicia Cachafeiro, J. García-Amor, and Elías Berriochoa

Subjects

Polynomial, 1206.07 Interpolación, Aproximación y Ajuste de Curvas, General Mathematics, 010103 numerical & computational mathematics, 01 natural sciences, symbols.namesake, Convergence (routing), Computer Science (miscellaneous), Applied mathematics, unit circle, perturbed roots of the unity, 0101 mathematics, Engineering (miscellaneous), Mathematics, convergence, lcsh:Mathematics, Lagrange polynomial, 1202.02 Teoría de la Aproximación, lcsh:QA1-939, 010101 applied mathematics, Cardinal point, Unit circle, Rate of convergence, Bounded function, symbols, nodal systems, separation properties, lagrange interpolation, Interpolation

Abstract

The aim of this paper is to study the Lagrange interpolation on the unit circle taking only into account the separation properties of the nodal points. The novelty of this paper is that we do not consider nodal systems connected with orthogonal or paraorthogonal polynomials, which is an interesting approach because in practical applications this connection may not exist. A detailed study of the properties satisfied by the nodal system and the corresponding nodal polynomial is presented. We obtain the relevant results of the convergence related to the process for continuous smooth functions as well as the rate of convergence. Analogous results for interpolation on the bounded interval are deduced and finally some numerical examples are presented.

Published

2020

30. Convergence Theorems for Modified Implicit Iterative Methods with Perturbation for Pseudocontractive Mappings

Author

Jong Soo Jung

Subjects

pseudocontractive mapping, Iterative method, lcsh:Mathematics, General Mathematics, 010102 general mathematics, Banach space, Perturbation (astronomy), weakly continuous duality mapping, Fixed point, nonexpansive mapping, lcsh:QA1-939, 01 natural sciences, 010101 applied mathematics, fixed point, modified implicit iterative methods with perturbed mapping, strongly pseudocontractive mapping, Computer Science (miscellaneous), Applied mathematics, Convex combination, 0101 mathematics, Engineering (miscellaneous), Mathematics

Abstract

In this paper, first, we introduce a path for a convex combination of a pseudocontractive type of mappings with a perturbed mapping and prove strong convergence of the proposed path in a real reflexive Banach space having a weakly continuous duality mapping. Second, we propose two modified implicit iterative methods with a perturbed mapping for a continuous pseudocontractive mapping in the same Banach space. Strong convergence theorems for the proposed iterative methods are established. The results in this paper substantially develop and complement the previous well-known results in this area.

Published

2020

31. Convergence in Fuzzy Semi-Metric Spaces

Author

Hsien-Chung Wu

Subjects

triangular norm, Mathematics::General Mathematics, General Mathematics, 02 engineering and technology, Type (model theory), 01 natural sciences, Fuzzy logic, Convergence (routing), 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Mathematics, Triangle inequality, dual fuzzy semi-metric, lcsh:Mathematics, 010102 general mathematics, fuzzy semi-metric space, lcsh:QA1-939, Infimum and supremum, Dual (category theory), triangle inequality, Metric space, 020201 artificial intelligence & image processing, ComputingMethodologies_GENERAL, metric convergence

Abstract

The convergence using the fuzzy semi-metric and dual fuzzy semi-metric is studied in this paper. The infimum type of dual fuzzy semi-metric and the supremum type of dual fuzzy semi-metric are proposed in this paper. Based on these two types of dual fuzzy semi-metrics, the different types of triangle inequalities can be obtained. We also study the convergence of these two types of dual fuzzy semi-metrics.

Published

2018

32. Homotopy Approach for Integrodifferential Equations

Author

Tomasz Trawiński, Edyta Hetmaniok, Krzysztof Gromysz, Roman Wituła, and Damian Słota

Subjects

integrodifferential equation, electromagnet jumper, convergence, Series (mathematics), lcsh:Mathematics, General Mathematics, Homotopy, homotopy analysis method, 010103 numerical & computational mathematics, lcsh:QA1-939, 01 natural sciences, vibrations, 010101 applied mathematics, Mechanical system, Vibration, error estimation, Convergence (routing), Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Element (category theory), Engineering (miscellaneous), Homotopy analysis method, Beam (structure), Mathematics

Abstract

In this paper, we present the application of the homotopy analysis method for solving integrodifferential equations. In this method, a series is created, the successive elements of which are determined by calculating the appropriate integral of the previous element. In this elaboration, we prove that, if this series is convergent, then its sum is the solution of the objective equation. We formulate and prove the sufficient condition of this convergence, and we give also the estimation of error of an approximate solution obtained by taking the partial sum of the considered series. Moreover, we present in this paper the example of using the investigated method for determining the vibrations of the freely supported reinforced concrete beam as well as for solving the equation of movement of the electromagnet jumper mechanical system.

Published

2019

33. The Mittag-Leffler Fitting of the Phillips Curve

Author

Tomas Skovranek

Subjects

General Economics (econ.GN), Relation (database), 020209 energy, General Mathematics, Mathematics::Classical Analysis and ODEs, 02 engineering and technology, FOS: Economics and business, symbols.namesake, Mathematics::Probability, Mittag-Leffler function, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Applied mathematics, Power function, Engineering (miscellaneous), Phillips curve, Damped oscillations, Economics - General Economics, Mathematics, lcsh:Mathematics, econometric modelling, 020206 networking & telecommunications, Function (mathematics), lcsh:QA1-939, Exponential function, Identification (information), symbols, identification

Abstract

In this paper, a mathematical model based on the one-parameter Mittag-Leffler function is proposed to be used for the first time to describe the relation between the unemployment rate and the inflation rate, also known as the Phillips curve. The Phillips curve is in the literature often represented by an exponential-like shape. On the other hand, Phillips in his fundamental paper used a power function in the model definition. Considering that the ordinary as well as generalised Mittag-Leffler function behave between a purely exponential function and a power function it is natural to implement it in the definition of the model used to describe the relation between the data representing the Phillips curve. For the modelling purposes the data of two different European economies, France and Switzerland, were used and an &ldquo, out-of-sample&rdquo, forecast was done to compare the performance of the Mittag-Leffler model to the performance of the power-type and exponential-type model. The results demonstrate that the ability of the Mittag-Leffler function to fit data that manifest signs of stretched exponentials, oscillations or even damped oscillations can be of use when describing economic relations and phenomenons, such as the Phillips curve.

Published

2019

34. Generalized Implicit Set-Valued Variational Inclusion Problem with ⊕ Operation

Author

Imran Ali, Ching-Feng Wen, Saddam Husain, A.A. Abdel–Latif, and Rais Ahmad

Subjects

algorithm, 021103 operations research, lcsh:Mathematics, set-valued mapping, General Mathematics, 0211 other engineering and technologies, 02 engineering and technology, ⊕ operation, Composition (combinatorics), lcsh:QA1-939, 01 natural sciences, 010101 applied mathematics, Set (abstract data type), inclusion, Convergence (routing), Resolvent operator, Computer Science (miscellaneous), Applied mathematics, implicit, 0101 mathematics, Engineering (miscellaneous), Inclusion (education), Mathematics

Abstract

In this paper, we consider a resolvent operator which depends on the composition of two mappings with &oplus, operation. We prove some of the properties of the resolvent operator, that is, that it is single-valued as well as Lipschitz-type-continuous. An existence and convergence result is proven for a generalized implicit set-valued variational inclusion problem with &oplus, operation. Some special cases of a generalized implicit set-valued variational inclusion problem with &oplus, operation are discussed. An example is constructed to illustrate some of the concepts used in this paper.

Published

2019

35. Fractional Langevin Equations with Nonlocal Integral Boundary Conditions

Author

Ahmed Salem, Faris Alzahrani, and Lamya Almaghamsi

Subjects

integral boundary condition, Class (set theory), lcsh:Mathematics, General Mathematics, 010102 general mathematics, fixed point theorem, Fixed-point theorem, lcsh:QA1-939, 01 natural sciences, fractional Langevin equations, 010101 applied mathematics, Nonlinear system, Computer Science (miscellaneous), Applied mathematics, Uniqueness, Boundary value problem, 0101 mathematics, Contraction principle, Engineering (miscellaneous), existence and uniqueness, Mathematics

Abstract

In this paper, we investigate a class of nonlinear Langevin equations involving two fractional orders with nonlocal integral and three-point boundary conditions. Using the Banach contraction principle, Krasnoselskii’s and the nonlinear alternative Leray Schauder theorems, the existence and uniqueness results of solutions are proven. The paper was appended examples which illustrate the applicability of the results.

Published

2019

36. Solving ODEs by Obtaining Purely Second Degree Multinomials via Branch and Bound with Admissible Heuristic

Author

Coşar Gözükirmizi and Metin Demiralp

Subjects

Kronecker product, General Mathematics, 010103 numerical & computational mathematics, 01 natural sciences, symbols.namesake, branch and bound, 0103 physical sciences, Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Mathematics, Recursion, 010304 chemical physics, Branch and bound, lcsh:Mathematics, Ode, Probabilistic logic, lcsh:QA1-939, Cauchy product, ordinary differential equations, Ordinary differential equation, symbols, Multinomial distribution, space extension

Abstract

Probabilistic evolution theory (PREVTH) forms a framework for the solution of explicit ODEs. The purpose of the paper is two-fold: (1) conversion of multinomial right-hand sides of the ODEs to purely second degree multinomial right-hand sides by space extension, (2) decrease the computational burden of probabilistic evolution theory by using the condensed Kronecker product. A first order ODE set with multinomial right-hand side functions may be converted to a first order ODE set with purely second degree multinomial right-hand side functions at the expense of an increase in the number of equations and unknowns. Obtaining purely second degree multinomial right-hand side functions is important because the solution of such equation set may be approximated by probabilistic evolution theory. A recent article by the authors states that the ODE set with the smallest number of unknowns can be found by searching. This paper gives the details of a way to search for the optimal space extension. As for the second purpose of the paper, the computational burden can be reduced by considering the properties of the Kronecker product of vectors and how the Kronecker product appears within the recursion of PREVTH: as a Cauchy product structure.

Published

2019

37. Discussion of 'Accurate and Efficient Explicit Approximations of the Colebrook Flow Friction Equation Based on the Wright ω-Function' by DejanBrkić; and Pavel Praks, Mathematics 2019, 7, 34; doi:10.3390/math7010034

Author

Lotfi Zeghadnia, Jean Loup Robert, and Bachir Achour

Subjects

Approximations of π, General Mathematics, Computation, Maximum deviation, 010103 numerical & computational mathematics, 02 engineering and technology, 01 natural sciences, Wright, 0203 mechanical engineering, maximum deviation, friction factor, Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Mathematics, turbulent flow, explicit solutions, Turbulence, lcsh:Mathematics, moody diagram, Function (mathematics), lcsh:QA1-939, Friction factor, 020303 mechanical engineering & transports, Flow (mathematics)

Abstract

The Colebrook-White equation is often used for calculation of the friction factor in turbulent regimes; it has succeeded in attracting a great deal of attention from researchers. The Colebrook–White equation is a complex equation where the computation of the friction factor is not direct, and there is a need for trial-error methods or graphical solutions; on the other hand, several researchers have attempted to alter the Colebrook-White equation by explicit formulas with the hope of achieving zero-percent (0%) maximum deviation, among them Dejan Brkić and Pavel Praks. The goal of this paper is to discuss the results proposed by the authors in their paper:” Accurate and Efficient Explicit Approximations of the Colebrook Flow Friction Equation Based on the Wright ω-Function” and to propose more accurate formulas.

Published

2019

38. Finite-Time Stabilization of Homogeneous Non-Lipschitz Systems

Author

Nawel Khelil and Martin J.-D. Otis

Subjects

Lyapunov function, 0209 industrial biotechnology, Computer science, General Mathematics, Stability (learning theory), Mathematics::Analysis of PDEs, Hölder condition, 02 engineering and technology, Positive-definite matrix, nonlinear system, 01 natural sciences, symbols.namesake, 020901 industrial engineering & automation, Control theory, control_systems_engineering, TheoryofComputation_ANALYSISOFALGORITHMSANDPROBLEMCOMPLEXITY, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), non-Lipschitzian dynamics, Applied mathematics, 0101 mathematics, Special case, Engineering (miscellaneous), Mathematics, lcsh:Mathematics, 010102 general mathematics, State (functional analysis), Lipschitz continuity, lcsh:QA1-939, finite-time control, Nonlinear system, symbols, 020201 artificial intelligence & image processing

Abstract

This paper focuses on the problem of finite-time stabilization of homogeneous, non-Lipschitz systems with dilations. A key contribution of this paper is the design of a virtual recursive Hölder, non-Lipschitz state feedback which renders the non-Lipschitz systems in the special case dominated by a lower-triangular nonlinear system, finite-time stable. The proof is based on a recursive design algorithm developed recently, to construct the virtual Hölder continuous, finite-time stabilizer as well as a C1 positive definite and proper Lyapunov function that guarantees finite-time stability of the non-Lipschitz non-linear systems.

Published

2016

39. The Role of the Mittag-Leffler Function in Fractional Modeling

Author

Sergei Rogosin

Subjects

Mittag-Leffler function, General Mathematics, Fractional equations, lcsh:Mathematics, 010102 general mathematics, Function (mathematics), lcsh:QA1-939, 01 natural sciences, Fractional calculus, 010101 applied mathematics, fractional equations, fractional modeling, symbols.namesake, Fractional analysis, Content (measure theory), Computer Science (miscellaneous), symbols, Calculus, Applied mathematics, 0101 mathematics, fractional integrals and derivatives, Engineering (miscellaneous), Mathematics

Abstract

This is a survey paper illuminating the distinguished role of the Mittag-Leffler function and its generalizations in fractional analysis and fractional modeling. The content of the paper is connected to the recently published monograph by Rudolf Gorenflo, Anatoly Kilbas, Francesco Mainardi and Sergei Rogosin.

Published

2015

40. Fractional Euler-Lagrange Equations Applied to Oscillatory Systems

Author

Carlos Alberto Valentim and Sergio Adriani David

Subjects

Oscillation, General Mathematics, Attenuation, lcsh:Mathematics, Fractional calculus, simulation, modeling, Derivative, lcsh:QA1-939, Nonlinear system, Amplitude, Integer, Control theory, oscillatory systems, Computer Science (miscellaneous), Order (group theory), Applied mathematics, Engineering (miscellaneous), SIMULAÇÃO (APRENDIZAGEM), dynamic systems, Mathematics

Abstract

In this paper, we applied the Riemann-Liouville approach and the fractional Euler-Lagrange equations in order to obtain the fractional nonlinear dynamic equations involving two classical physical applications: “Simple Pendulum” and the “Spring-Mass-Damper System” to both integer order calculus (IOC) and fractional order calculus (FOC) approaches. The numerical simulations were conducted and the time histories and pseudo-phase portraits presented. Both systems, the one that already had a damping behavior (Spring-Mass-Damper) and the system that did not present any sort of damping behavior (Simple Pendulum), showed signs indicating a possible better capacity of attenuation of their respective oscillation amplitudes. This implication could mean that if the selection of the order of the derivative is conveniently made, systems that need greater intensities of damping or vibrating absorbers may benefit from using fractional order in dynamics and possibly in control of the aforementioned systems. Thereafter, we believe that the results described in this paper may offer greater insights into the complex behavior of these systems, and thus instigate more research efforts in this direction.

Published

2015

41. New Approach for Fractional Order Derivatives: Fundamentals and Analytic Properties

Author

Ali Karci

Subjects

General Mathematics, Fréchet derivative, 02 engineering and technology, fractional calculus, Third derivative, 01 natural sciences, Generalizations of the derivative, fractional order derivatives, Total derivative, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Second derivative, Mathematics, lcsh:Mathematics, 010102 general mathematics, Mathematical analysis, Reduced derivative, lcsh:QA1-939, Symmetric derivative, Parametric derivative, derivatives, 020201 artificial intelligence & image processing

Abstract

The rate of change of any function versus its independent variables was defined as a derivative. The fundamentals of the derivative concept were constructed by Newton and l’Hôpital. The followers of Newton and l’Hôpital defined fractional order derivative concepts. We express the derivative defined by Newton and l’Hôpital as an ordinary derivative, and there are also fractional order derivatives. So, the derivative concept was handled in this paper, and a new definition for derivative based on indefinite limit and l’Hôpital’s rule was expressed. This new approach illustrated that a derivative operator may be non-linear. Based on this idea, the asymptotic behaviors of functions were analyzed and it was observed that the rates of changes of any function attain maximum value at inflection points in the positive direction and minimum value (negative) at inflection points in the negative direction. This case brought out the fact that the derivative operator does not have to be linear; it may be non-linear. Another important result of this paper is the relationships between complex numbers and derivative concepts, since both concepts have directions and magnitudes.

Published

2016

42. The Existence and Uniqueness of the Solution of a Nonlinear Fredholm–Volterra Integral Equation with Modified Argument via Geraghty Contractions

Author

Maria Dobriţoiu

Subjects

General Mathematics, lcsh:Mathematics, 010102 general mathematics, Fixed point, Nonlinear integral equation, lcsh:QA1-939, 01 natural sciences, Integral equation, Volterra integral equation, 010101 applied mathematics, Nonlinear system, symbols.namesake, integral equation, fixed point, modified argument, Argument, Computer Science (miscellaneous), symbols, Applied mathematics, b-metric space, Uniqueness, 0101 mathematics, Engineering (miscellaneous), Geraghty contraction, Mathematics

Abstract

Using some of the extended fixed point results for Geraghty contractions in b-metric spaces given by Faraji, Savić and Radenović and their idea to apply these results to nonlinear integral equations, in this paper we present some existence and uniqueness conditions for the solution of a nonlinear Fredholm&ndash, Volterra integral equation with a modified argument.

Published

2021

43. The Influence of Fear Effect to a Discrete-Time Predator-Prey System with Predator Has Other Food Resource

Author

Fengde Chen, Jialin Chen, and Xiaqing He

Subjects

Extinction, lcsh:Mathematics, General Mathematics, Trivial equilibrium, fear effect, lcsh:QA1-939, 01 natural sciences, 010305 fluids & plasmas, Predation, 010101 applied mathematics, other food resource, Nonlinear Sciences::Adaptation and Self-Organizing Systems, Discrete time and continuous time, 0103 physical sciences, Interior equilibrium, Computer Science (miscellaneous), Applied mathematics, Quantitative Biology::Populations and Evolution, 0101 mathematics, Food resource, Engineering (miscellaneous), Predator, global attractivity, Mathematics, discrete predator-prey system

Abstract

A discrete-time predator–prey system incorporating fear effect of the prey with the predator has other food resource is proposed in this paper. The trivial equilibrium and the predator free equilibrium are both unstable. A set of sufficient conditions for the global attractivity of prey free equilibrium and interior equilibrium are established by using iteration scheme and the comparison principle of difference equations. Our study shows that due to the fear of predation, the prey species will be driven to extinction while the predator species tends to be stable since it has other food resource, i.e., the prey free equilibrium may be globally stable under some suitable conditions. Numeric simulations are provided to illustrate the feasibility of the main results.

Published

2021

44. A Robust Version of the Empirical Likelihood Estimator

Author

Amor Keziou and Aida Toma

Subjects

General Mathematics, Monte Carlo method, empirical likelihood, robustness, 01 natural sciences, 010104 statistics & probability, Orthogonality, Robustness (computer science), Consistency (statistics), Computer Science (miscellaneous), Applied mathematics, Statistics::Methodology, 0101 mathematics, Divergence (statistics), Engineering (miscellaneous), Mathematics, estimation, lcsh:Mathematics, 010102 general mathematics, Estimator, lcsh:QA1-939, moment condition models, Statistics::Computation, Moment (mathematics), Empirical likelihood, ComputingMethodologies_PATTERNRECOGNITION

Abstract

In this paper, we introduce a robust version of the empirical likelihood estimator for semiparametric moment condition models. This estimator is obtained by minimizing the modified Kullback–Leibler divergence, in its dual form, using truncated orthogonality functions. We prove the robustness and the consistency of the new estimator. The performance of the robust empirical likelihood estimator is illustrated through examples based on Monte Carlo simulations.

Published

2021

45. A Singularly P-Stable Multi-Derivative Predictor Method for the Numerical Solution of Second-Order Ordinary Differential Equations

Author

Mohammad Mehdi Rashidi, Hamid Mohammad-Sedighi, Beny Neta, Mohammad Mehdizadeh Khalsaraei, and Ali Shokri

Subjects

singularly P-stable, symmetric methods, General Mathematics, lcsh:Mathematics, 010103 numerical & computational mathematics, Derivative, lcsh:QA1-939, 01 natural sciences, Stability (probability), Numerical integration, 010101 applied mathematics, symbols.namesake, Mathieu function, Consistency (statistics), Ordinary differential equation, Computer Science (miscellaneous), symbols, Applied mathematics, linear multistep methods, 0101 mathematics, multiderivative methods, Engineering (miscellaneous), Mathematics, Linear multistep method, Variable (mathematics)

Abstract

In this paper, a symmetric eight-step predictor method (explicit) of 10th order is presented for the numerical integration of IVPs of second-order ordinary differential equations. This scheme has variable coefficients and can be used as a predictor stage for other implicit schemes. First, we showed the singular P-stability property of the new method, both algebraically and by plotting the stability region. Then, having applied it to well-known problems like Mathieu equation, we showed the advantage of the proposed method in terms of efficiency and consistency over other methods with the same order.

Published

2021

46. Weak Convergence Analysis and Improved Error Estimates for Decoupled Forward-Backward Stochastic Differential Equations

Author

Hui Min and Wei Zhang

Subjects

Weak convergence, Basis (linear algebra), Discretization, General Mathematics, lcsh:Mathematics, Mathematics::Optimization and Control, Forward backward, 010103 numerical & computational mathematics, weak convergence analysis, lcsh:QA1-939, 01 natural sciences, forward-backward differential equations, 010101 applied mathematics, Stochastic differential equation, symbols.namesake, Itô Taylor expansion, error estimates, Computer Science (miscellaneous), Taylor series, symbols, Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Mathematics

Abstract

In this paper, we mainly investigate the weak convergence analysis about the error terms which are determined by the discretization for solving the stochastic differential equation (SDE, for short) in forward-backward stochastic differential equations (FBSDEs, for short), which is on the basis of Itô Taylor expansion, the numerical SDE theory, and numerical FBSDEs theory. Under the weak convergence analysis of FBSDEs, we further establish better error estimates of recent numerical schemes for solving FBSDEs.

Published

2021

47. On the Local Convergence of Two-Step Newton Type Method in Banach Spaces Under Generalized Lipschitz Conditions

Author

Kamal R. Pardasani, Christopher I. Argyros, Ioannis K. Argyros, Akanksha Saxena, and Jai Prakash Jaiswal

Subjects

Iterative method, General Mathematics, lcsh:Mathematics, L-average, 010102 general mathematics, Banach space, lipschitz condition, 010103 numerical & computational mathematics, Lipschitz continuity, lcsh:QA1-939, 01 natural sciences, Local convergence, Nonlinear system, Rate of convergence, convergence ball, Convergence (routing), Computer Science (miscellaneous), Applied mathematics, local convergence, Locally integrable function, nonlinear problem, 0101 mathematics, Engineering (miscellaneous), banach space, Mathematics

Abstract

The motive of this paper is to discuss the local convergence of a two-step Newton-type method of convergence rate three for solving nonlinear equations in Banach spaces. It is assumed that the first order derivative of nonlinear operator satisfies the generalized Lipschitz i.e., L-average condition. Also, some results on convergence of the same method in Banach spaces are established under the assumption that the derivative of the operators satisfies the radius or center Lipschitz condition with a weak L-average particularly it is assumed that L is positive integrable function but not necessarily non-decreasing. Our new idea gives a tighter convergence analysis without new conditions. The proposed technique is useful in expanding the applicability of iterative methods. Useful examples justify the theoretical conclusions.

Published

2021

48. The Convergence Rate of High-Dimensional Sample Quantiles for φ-Mixing Observation Sequences

Author

Dong Han and Ling Peng

Subjects

Sequence, Statistics::Theory, φ-mixing dependent sequence, lcsh:Mathematics, General Mathematics, 010102 general mathematics, sample quantiles, High dimensional, lcsh:QA1-939, 01 natural sciences, Sample (graphics), Statistics::Computation, 010104 statistics & probability, convergence rate, Rate of convergence, Computer Science (miscellaneous), Computer Science::Programming Languages, Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Mixing (physics), Mathematics, Quantile

Abstract

In this paper, we obtain the convergence rate for the high-dimensional sample quantiles with the φ-mixing dependent sequence. The resulting convergence rate is shown to be faster than that obtained by the Hoeffding-type inequalities. Moreover, the convergence rate of the high-dimensional sample quantiles for the observation sequence taking discrete values is also provided.

Published

2021

49. Global Dynamics of a Discrete-Time MERS-Cov Model

Author

Mohammad A. Safi, Morad Ahmad, and Mahmoud H. DarAssi

Subjects

0303 health sciences, Computer simulation, General Mathematics, coronaviruses, lcsh:Mathematics, Dynamics (mechanics), lcsh:QA1-939, 01 natural sciences, equilibria, global stability, 03 medical and health sciences, Discrete time and continuous time, MERS, Stability theory, 0103 physical sciences, discrete-time model, Computer Science (miscellaneous), Applied mathematics, backward difference, 010301 acoustics, Engineering (miscellaneous), 030304 developmental biology, Mathematics

Abstract

In this paper, we have investigated the global dynamics of a discrete-time middle east respiratory syndrome (MERS-Cov) model. The proposed discrete model was analyzed and the threshold conditions for the global attractivity of the disease-free equilibrium (DFE) and the endemic equilibrium are established. We proved that the DFE is globally asymptotically stable when R0≤1. Whenever R˜0&gt, 1, the proposed model has a unique endemic equilibrium that is globally asymptotically stable. The theoretical results are illustrated by a numerical simulation.

Published

2021

50. Controllability for Retarded Semilinear Neutral Control Systems of Fractional Order in Hilbert Spaces

Author

Daewook Kim and Jin-Mun Jeong

Subjects

0209 industrial biotechnology, Class (set theory), General Mathematics, 010103 numerical & computational mathematics, 02 engineering and technology, 01 natural sciences, symbols.namesake, 020901 industrial engineering & automation, Simple (abstract algebra), fractional order differential equation, Computer Science (miscellaneous), Order (group theory), Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Mathematics, lcsh:Mathematics, Linear system, Hilbert space, approximate controllability, lcsh:QA1-939, Controllability, Nonlinear system, retarded neutral system, Control system, symbols, semilinear system

Abstract

In this paper, we discuss the approximate controllability for a class of retarded semilinear neutral control systems of fractional order by investigating the relations between the reachable set of the semilinear retarded neutral system of fractional order and that of its corresponding linear system. The research direction used here is to find the conditions for nonlinear terms so that controllability is maintained even in perturbations. Finally, we will show a simple example to which the main result can be applied.

Published

2021