Showing total 575 results

1. On Some Properties of the New Generalized Fractional Derivative with Non-Singular Kernel

Author

Khalid Hattaf

Subjects

Lyapunov function, Article Subject, Non singular, General Mathematics, Science and engineering, General Engineering, Engineering (General). Civil engineering (General), 01 natural sciences, 010305 fluids & plasmas, Fractional calculus, 010101 applied mathematics, symbols.namesake, Exponential stability, Kernel (statistics), 0103 physical sciences, QA1-939, symbols, Applied mathematics, TA1-2040, 0101 mathematics, Mathematics

Abstract

This paper presents some new formulas and properties of the generalized fractional derivative with non-singular kernel that covers various types of fractional derivatives such as the Caputo–Fabrizio fractional derivative, the Atangana–Baleanu fractional derivative, and the weighted Atangana–Baleanu fractional derivative. These new properties extend many recent results existing in the literature. Furthermore, the paper proposes some interesting inequalities that estimate the generalized fractional derivatives of some specific functions. These inequalities can be used to construct Lyapunov functions with the aim to study the global asymptotic stability of several fractional-order systems arising from diverse fields of science and engineering.

Published

2021

2. Existence and Uniqueness of the Global L1 Solution of the Euler Equations for Chaplygin Gas

Author

Zhen Wang, Tingting Chen, and Aifang Qu

Subjects

Continuous function, General Mathematics, Weak solution, 010102 general mathematics, General Physics and Astronomy, Euler system, Absolute continuity, Lebesgue integration, 01 natural sciences, 010101 applied mathematics, symbols.namesake, symbols, Local boundedness, Applied mathematics, Initial value problem, Uniqueness, 0101 mathematics, Mathematics

Abstract

In this paper, we establish the global existence and uniqueness of the solution of the Cauchy problem of a one-dimensional compressible isentropic Euler system for a Chaplygin gas with large initial data in the space L loc 1 . The hypotheses on the initial data may be the least requirement to ensure the existence of a weak solution in the Lebesgue measurable sense. The novelty and also the essence of the difficulty of the problem lie in the fact that we have neither the requirement on the local boundedness of the density nor that which is bounded away from vacuum. We develop the previous results on this degenerate system. The method used is Lagrangian representation, the essence of which is characteristic analysis. The key point is to prove the existence of the Lagrangian representation and the absolute continuity of the potentials constructed with respect to the space and the time variables. We achieve this by finding a property of the fundamental theorem of calculus for Lebesgue integration, which is a sufficient and necessary condition for judging whether a monotone continuous function is absolutely continuous. The assumptions on the initial data in this paper are believed to also be necessary for ruling out the formation of Dirac singularity of density. The ideas and techniques developed here may be useful for other nonlinear problems involving similar difficulties.

Published

2021

3. EXISTENCE OF SOLUTIONS TO FRACTIONAL DIFFERENTIAL EQUATIONS WITH FRACTIONAL-ORDER DERIVATIVE TERMS

Author

Ai Sun, Tongxiang Li, Qingchun Yuan, and You-Hui Su

Subjects

Computer simulation, Iterative method, General Mathematics, 010102 general mathematics, Fixed-point theorem, Derivative, Function (mathematics), 01 natural sciences, 010101 applied mathematics, Nonlinear system, symbols.namesake, Green's function, symbols, Applied mathematics, Point (geometry), 0101 mathematics, Mathematics

Abstract

The study in this paper is made on the nonlinear fractional differential equation whose nonlinearity involves the explicit fractional order D0+β u(t). The corresponding Green's function is derived first, and then the completely continuous operator is proved. Besides, based on the Schauder's fixed point theorem and the Krasnosel'skii's fixed point theorem, the sufficient conditions for at least one or two existence of positive solutions are established. Furthermore, several other sufficient conditions for at least three, n or 2n-1 positive solutions are also obtained by applying the generalized AveryHenderson fixed point theorem and the Avery-Peterson fixed point theorem. Finally, several simulation examples are provided to illustrate the main results of the paper. In particularly, a novel efficient iterative method is employed for simulating the examples mentioned above, that is, the interesting point of this paper is that the approximation graphics for the solutions are given by using the iterative method.

Published

2021

4. Minimization arguments in analysis of variational-hemivariational inequalities

Author

Weimin Han and Mircea Sofonea

Subjects

Applied Mathematics, General Mathematics, Hilbert space, Structure (category theory), General Physics and Astronomy, Contrast (statistics), 010103 numerical & computational mathematics, Fixed point, 01 natural sciences, 010101 applied mathematics, Nonlinear system, symbols.namesake, Contact mechanics, Compact space, symbols, Applied mathematics, Minification, 0101 mathematics, Mathematics

Abstract

In this paper, an alternative approach is provided in the well-posedness analysis of elliptic variational–hemivariational inequalities in real Hilbert spaces. This includes the unique solvability and continuous dependence of the solution on the data. In most of the existing literature on elliptic variational–hemivariational inequalities, well-posedness results are obtained by using arguments of surjectivity for pseudomonotone multivalued operators, combined with additional compactness and pseudomonotonicity properties. In contrast, following (Han in Nonlinear Anal B Real World Appl 54:103114, 2020; Han in Numer Funct Anal Optim 42:371–395, 2021), the approach adopted in this paper is based on the fixed point structure of the problems, combined with minimization principles for elliptic variational–hemivariational inequalities. Consequently, only elementary results of functional analysis are needed in the approach, which makes the theory of elliptic variational–hemivariational inequalities more accessible to applied mathematicians and engineers. The theoretical results are illustrated on a representative example from contact mechanics.

Published

2022

5. Optimal-rate finite-element solution of Dirichlet problems in curved domains with straight-edged tetrahedra

Author

Vitoriano Ruas

Subjects

Applied Mathematics, General Mathematics, Mathematical analysis, 010103 numerical & computational mathematics, Finite element solution, 01 natural sciences, Dirichlet distribution, 010101 applied mathematics, Computational Mathematics, symbols.namesake, Tetrahedron, symbols, 0101 mathematics, Mathematics

Abstract

In a series of papers published since 2017 the author introduced a simple alternative of the $n$-simplex type, to enhance the accuracy of approximations of second-order boundary value problems subject to Dirichlet boundary conditions, posed on smooth curved domains. This technique is based upon trial functions consisting of piecewise polynomials defined on straight-edged triangular or tetrahedral meshes, interpolating the Dirichlet boundary conditions at points of the true boundary. In contrast, the test functions are defined by the standard degrees of freedom associated with the underlying method for polytopic domains. While the mathematical analysis of the method for Lagrange and Hermite methods for two-dimensional second- and fourth-order problems was carried out in earlier paper by the author this paper is devoted to the study of the three-dimensional case. Well-posedness, uniform stability and optimal a priori error estimates in the energy norm are proved for a tetrahedron-based Lagrange family of finite elements. Novel error estimates in the $L^2$-norm, for the class of problems considered in this work, are also proved. A series of numerical examples illustrates the potential of the new technique. In particular, its superior accuracy at equivalent cost, as compared to the isoparametric technique, is highlighted.

Published

2020

6. Adaptive ADI Numerical Analysis of 2D Quenching-Type Reaction: Diffusion Equation with Convection Term

Author

Xiaoliang Zhu and Yongbin Ge

Subjects

Article Subject, Discretization, General Mathematics, Numerical analysis, Degenerate energy levels, General Engineering, Finite difference, Engineering (General). Civil engineering (General), 01 natural sciences, 010305 fluids & plasmas, 010101 applied mathematics, Nonlinear system, symbols.namesake, Alternating direction implicit method, 0103 physical sciences, Reaction–diffusion system, QA1-939, Taylor series, symbols, Applied mathematics, TA1-2040, 0101 mathematics, Mathematics

Abstract

An adaptive high-order difference solution about a 2D nonlinear degenerate singular reaction-diffusion equation with a convection term is initially proposed in the paper. After the first and the second central difference operator approximating the first-order and the second-order spatial derivative, respectively, the higher-order spatial derivatives are discretized by applying the Taylor series rule and the temporal derivative is discretized by using the Crank–Nicolson (CN) difference scheme. An alternating direction implicit (ADI) scheme with a nonuniform grid is built in this way. Meanwhile, accuracy analysis declares the second order in time and the fourth order in space under certain conditions. Sequentially, the high-order scheme is performed on an adaptive mesh to demonstrate quenching behaviors of the singular parabolic equation and analyse the influence of combustion chamber size on quenching. The paper displays rationally that the proposed scheme is practicable for solving the 2D quenching-type problem.

Published

2020

7. Trace finite element methods for surface vector-Laplace equations

Author

Thomas Jankuhn and Arnold Reusken

Subjects

Partial differential equation, Discretization, Applied Mathematics, General Mathematics, Tangent, Numerical Analysis (math.NA), 010103 numerical & computational mathematics, 01 natural sciences, Finite element method, 010101 applied mathematics, Computational Mathematics, symbols.namesake, Lagrange multiplier, Norm (mathematics), ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, FOS: Mathematics, symbols, 65N30, 65N12, 65N15, Applied mathematics, Vector field, Penalty method, Mathematics - Numerical Analysis, 0101 mathematics, Mathematics

Abstract

In this paper we analyze a class of trace finite element methods for the discretization of vector-Laplace equations. A key issue in the finite element discretization of such problems is the treatment of the constraint that the unknown vector field must be tangential to the surface (‘tangent condition’). We study three different natural techniques for treating the tangent condition, namely a consistent penalty method, a simpler inconsistent penalty method and a Lagrange multiplier method. The main goal of the paper is to present an analysis that reveals important properties of these three different techniques for treating the tangent constraint. A detailed error analysis is presented that takes the approximation of both the geometry of the surface and the solution of the partial differential equation into account. Error bounds in the energy norm are derived that show how the discretization error depends on relevant parameters such as the degree of the polynomials used for the approximation of the solution, the degree of the polynomials used for the approximation of the level set function that characterizes the surface, the penalty parameter and the degree of the polynomials used for the approximation of the Lagrange multiplier.

Published

2020

8. Null controllability of semi-linear fourth order parabolic equations

Author

K. Kassab, Laboratoire Jacques-Louis Lions (LJLL (UMR_7598)), and Sorbonne Université (SU)-Centre National de la Recherche Scientifique (CNRS)-Université de Paris (UP)

Subjects

Null controllability, Observability, Global Carleman estimate, Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, Null (mathematics), Exact controllability, 01 natural sciences, Parabolic partial differential equation, Dirichlet distribution, Domain (mathematical analysis), 010101 applied mathematics, Controllability, symbols.namesake, Linear and semi-linear fourth order parabolic equation, Bounded function, MSC : 35K35, 93B05, 93B07, Neumann boundary condition, symbols, [MATH]Mathematics [math], 0101 mathematics, Mathematics

Abstract

International audience; In this paper, we consider a semi-linear fourth order parabolic equation in a bounded smooth domain Ω with homogeneous Dirichlet and Neumann boundary conditions. The main result of this paper is the null controllability and the exact controllability to the trajectories at any time T > 0 for the associated control system with a control function acting at the interior.; Dans ce papier, on considère uneéquation parabolique semi-linéaire de quatrième ordre dans un domaine borné régulier Ω avec des conditions aux limites de type Dirichlet et Neumann homogènes. Le résultat principal de ce papier concerne la contrôlabilitéà zéro et la contrôlabilité exacte pour tout T > 0 du système de contrôle associé avec un contrôle agissantà l'interieur.

Published

2020

9. On Multiscale RBF Collocation Methods for Solving the Monge–Ampère Equation

Author

Qiuyan Xu and Zhiyong Liu

Subjects

Collocation, Article Subject, General Mathematics, Direct method, General Engineering, Boundary (topology), Monge–Ampère equation, 010103 numerical & computational mathematics, Engineering (General). Civil engineering (General), 01 natural sciences, Dirichlet distribution, 010101 applied mathematics, Discrete system, symbols.namesake, Nonlinear system, QA1-939, symbols, Applied mathematics, Radial basis function, TA1-2040, 0101 mathematics, Mathematics

Abstract

This paper considers some multiscale radial basis function collocation methods for solving the two-dimensional Monge–Ampère equation with Dirichlet boundary. We discuss and study the performance of the three kinds of multiscale methods. The first method is the cascadic meshfree method, which was proposed by Liu and He (2013). The second method is the stationary multilevel method, which was proposed by Floater and Iske (1996), and is used to solve the fully nonlinear partial differential equation in the paper for the first time. The third is the hierarchical radial basis function method, which is constructed by employing successive refinement scattered data sets and scaled compactly supported radial basis functions with varying support radii. Compared with the first two methods, the hierarchical radial basis function method can not only solve the present problem on a single level with higher accuracy and lower computational cost but also produce highly sparse nonlinear discrete system. These observations are obtained by taking the direct approach of numerical experimentation.

Published

2020

10. KAM Tori for the Derivative Quintic Nonlinear Schrödinger Equation

Author

Guang Hua Shi and Dong Feng Yan

Subjects

Kolmogorov–Arnold–Moser theorem, Applied Mathematics, General Mathematics, 010102 general mathematics, Mean value, Zero (complex analysis), Torus, Derivative, 01 natural sciences, Quintic function, 010101 applied mathematics, symbols.namesake, symbols, 0101 mathematics, Nonlinear Schrödinger equation, Mathematical physics, Mathematics

Abstract

This paper is concerned with one-dimensional derivative quintic nonlinear Schrodinger equation, $${\rm{i}}u_t-u_{xx}+{\rm{i}}(|u|^4u)_x=0, \;\; x\in\mathbb{T}.$$ The existence of a large amount of quasi-periodic solutions with two frequencies for this equation is established. The proof is based on partial Birkhoff normal form technique and an unbounded KAM theorem. We mention that in the present paper the mean value of u does not need to be zero, but small enough, which is different from the assumption (1.7) in Geng-Wu [J. Math. Phys., 53, 102702 (2012)].

Published

2020

11. EXISTENCE OF SOLUTIONS FOR DUAL SINGULAR INTEGRAL EQUATIONS WITH CONVOLUTION KERNELS IN CASE OF NON-NORMAL TYPE

Author

Pingrun Li

Subjects

General Mathematics, 010102 general mathematics, Singular integral, Type (model theory), 01 natural sciences, Integral equation, Dual (category theory), Convolution, 010101 applied mathematics, Riemann hypothesis, symbols.namesake, Fourier transform, symbols, Applied mathematics, Boundary value problem, 0101 mathematics, Mathematics

Abstract

This paper is devoted to the study of dual singular integral equations with convolution kernels in the case of non-normal type. Via using the Fourier transforms, we transform such equations into Riemann boundary value problems. To solve the equation, we establish the regularity theory of solvability. The general solutions and the solvable conditions of the equation are obtained. Especially, we investigate the asymptotic property of solutions at nodes. This paper will have a significant meaning for the study of improving and developing complex analysis, integral equations and Riemann boundary value problems.

Published

2020

12. Boundary value problems for the Brinkman system with L∞ coefficients in Lipschitz domains on compact Riemannian manifolds. A variational approach

Author

Wolfgang L. Wendland and Mirela Kohr

Subjects

Pure mathematics, Applied Mathematics, General Mathematics, Weak solution, 010102 general mathematics, Mathematics::Analysis of PDEs, Fixed-point theorem, Riemannian manifold, Lipschitz continuity, 01 natural sciences, Dirichlet distribution, Physics::Fluid Dynamics, 010101 applied mathematics, Sobolev space, Nonlinear system, symbols.namesake, symbols, Boundary value problem, 0101 mathematics, Mathematics

Abstract

The purpose of this paper is to show well-posedness results in L 2 -based Sobolev spaces for transmission, Dirichlet, Neumann, and mixed boundary value problems for the Brinkman system with L ∞ coefficients in Lipschitz domains on a compact Riemannian manifold of dimension m ≥ 2 . The Dirichlet, transmission, and mixed problems for the nonlinear Darcy-Forchheimer-Brinkman system with L ∞ coefficients are also analyzed. First, we focus on the well-posedness of linear transmission, Dirichlet and mixed boundary value problems for the Brinkman system with L ∞ coefficients in Lipschitz domains on compact Riemannian manifolds by using a variational approach that reduces such a boundary value problem to a mixed variational formulation defined in terms of two bilinear continuous forms, one of them satisfying a coercivity condition and another one the inf-sup condition. Further, we show the equivalence between each boundary value problem for the Brinkman system with L ∞ coefficients and its mixed variational counterpart, and then the well posedness in L 2 -based Sobolev spaces by using the Necas-Babuska-Brezzi technique. The second goal of this paper is the construction of the Newtonian and layer potential operators for the Brinkman system with L ∞ coefficients in Lipschitz domains on compact Riemannian manifolds by using the well-posedness results for the analyzed linear transmission problems. Various mapping properties of these operators are also obtained and used to describe the weak solutions of the Poisson problems with Dirichlet and Neumann conditions for the nonsmooth Brinkman system in terms of such potentials. Finally, we combine the well-posedness results of the Poisson problems of Dirichlet, transmission, and mixed type for the nonsmooth Brinkman system with a fixed point theorem in order to show the existence of a weak solution of the Poisson problem of Dirichlet, transmission, or mixed type for the (nonlinear) Darcy-Forchheimer-Brinkman system with L ∞ coefficients in L 2 -based Sobolev spaces in Lipschitz domains on compact Riemannian manifolds of dimension m ∈ { 2 , 3 } .

Published

2019

13. Convergence of boundary layers for the Keller–Segel system with singular sensitivity in the half-plane

Author

Qianqian Hou and Zhi-An Wang

Subjects

Plane (geometry), Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, Prandtl number, Boundary (topology), Space (mathematics), 01 natural sciences, 010101 applied mathematics, Boundary layer, symbols.namesake, symbols, Boundary value problem, 0101 mathematics, Layer (object-oriented design), Degeneracy (mathematics), Mathematics

Abstract

Though the boundary layer formation in the chemotactic process has been observed in experiment (cf. [63] ), the mathematical study on the boundary layer solutions of chemotaxis models is just in its infant stage. Apart from the sophisticated theoretical tools involved in the analysis, how to impose/derive physical boundary conditions is a state-of-the-art in studying the boundary layer problem of chemotaxis models. This paper will proceed with a previous work [24] in one dimension to establish the convergence of boundary layer solutions of the Keller–Segel model with singular sensitivity in a two-dimensional space (half-plane) with respect to the chemical diffusion rate denoted by e ≥ 0 . Compared to the one-dimensional boundary layer problem, there are many new issues arising from multi-dimensions such as possible Prandtl type degeneracy, curl-free preservation and well-posedness of large-data solutions. In this paper, we shall derive appropriate physical boundary conditions and gradually overcome these barriers and hence establish the convergence of boundary layer solutions of the singular Keller–Segel system in the half-plane as the chemical diffusion rate vanishes. Specially speaking, we justify that the boundary layer converges to the outer layer (solution with e = 0 ) plus the inner layer as e → 0 , where both outer and inner layer profiles are precisely derived and well understood. By doing this, the structure of boundary layer solutions is clearly characterized. We hope that our results and methods can shed lights on the understanding of underlying mechanisms of the boundary layer patterns observed in the experiment for chemotaxis such as the work by Tuval et al. [63] , and open a new window in the future theoretical study of chemotaxis models.

Published

2019

14. Explicit Solutions of Initial Value Problems for Fractional Generalized Proportional Differential Equations with and without Impulses

Author

Mohamed I. Abbas and Snezhana Hristova

Subjects

Physics and Astronomy (miscellaneous), Differential equation, General Mathematics, 010102 general mathematics, Scalar (physics), Function (mathematics), Type (model theory), 01 natural sciences, Symmetry (physics), 010101 applied mathematics, symbols.namesake, Transformation (function), generalized proportional fractional derivatives, Chemistry (miscellaneous), Mittag-Leffler function, QA1-939, Computer Science (miscellaneous), symbols, Initial value problem, Applied mathematics, Mittag–Leffler function, 0101 mathematics, Mathematics

Abstract

The object of investigation in this paper is a scalar linear fractional differential equation with generalized proportional derivative of Riemann–Liouville type (LFDEGD). The main goal is the obtaining an explicit solution of the initial value problem of the studied equation. Note that the locally solvability, being the same as the existence of solutions to the initial value problem, is connected with the symmetry of a transformation of a system of differential equations. At the same time, several criteria for existence of the initial value problem for nonlinear fractional differential equations with generalized proportional derivative are connected with the linear ones. It leads to the necessity of obtaining an explicit solution of LFDEGD. In this paper two cases are studied: the case of no impulses in the differential equation are presented and the case when instantaneous impulses at initially given points are involved. All obtained formulas are based on the application of Mittag–Leffler function with two parameters. In the case of impulses, initially the appropriate impulsive conditions are set up and later the explicit solutions are obtained.

Published

2021

15. Solution for nonvariational quasilinear elliptic systems via sub-supersolution technique and Galerkin method

Author

Leandro S. Tavares, Francisco Julio S. A. Corrêa, and Gelson C. G. dos Santos

Subjects

Change of variables, Elliptic systems, Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematics::Analysis of PDEs, General Physics and Astronomy, Monotonic function, Type (model theory), 01 natural sciences, Schrödinger equation, 010101 applied mathematics, symbols.namesake, symbols, Dissipative system, Applied mathematics, 0101 mathematics, Galerkin method, Schrödinger's cat, Mathematics

Abstract

In this paper, we obtain the existence of positive solution for a system of quasilinear Schrodinger equations with concave nonlinearities which is related to several applications in Hydrodynamics, Heidelberg Ferromagnetism and Magnus Theory, Condensed Matter Theory, Dissipative Quantum Mechanics and nanotubes and fullerene-related structures. The quasilinear Schrodinger problem is studied by considering a suitable change of variables which transforms the original problem in to a semilinear one. By means of the several properties of the change of variables, constructions of suitable sub-supersolutions, monotonic iteration arguments and the Galerkin method, we obtain the existence of solution for the semilinear problem. The paper is divided in two parts. In the first one, we use the method of sub-supersolutions to obtain a solution for the problem. In the second part, we use the Galerkin method and a comparison argument to obtain a solution for the system considered. An important feature is that the sub-supersolution approach is rare in the literature for the type of problem considered here and the Galerkin method was not used to consider quasilinear Schrodinger equations.

Published

2021

16. ON SOLVABILITY OF SINGULAR INTEGRAL-DIFFERENTIAL EQUATIONS WITH CONVOLUTION

Author

Pingrun Li

Subjects

Differential equation, General Mathematics, Analytic continuation, 010102 general mathematics, Type (model theory), Singular integral, 01 natural sciences, Integral equation, Convolution, 010101 applied mathematics, symbols.namesake, Fourier analysis, symbols, Applied mathematics, Boundary value problem, 0101 mathematics, Mathematics

Abstract

In this paper, we study a class of singular integral-different equations of convolution type with Cauchy kernel. By means of the classical boundary value theory, of the theory of Fourier analysis, and of the principle of analytic continuation, we transform the equations into the Riemann-Hilbert problems with discontinuous coefficients and obtain the general solutions and conditions of solvability in class {0}. Thus, the result in this paper generalizes the classical theory of integral equations and boundary value problems.

Published

2019

17. Superconvergence of kernel-based interpolation

Author

Robert Schaback

Subjects

Numerical Analysis, Applied Mathematics, General Mathematics, Open problem, Hilbert space, Numerical Analysis (math.NA), 010103 numerical & computational mathematics, Positive-definite matrix, Superconvergence, Eigenfunction, 01 natural sciences, 010101 applied mathematics, symbols.namesake, Spline (mathematics), FOS: Mathematics, symbols, Applied mathematics, Mathematics - Numerical Analysis, Boundary value problem, 0101 mathematics, Spline interpolation, Analysis, Mathematics

Abstract

From spline theory it is well-known that univariate cubic spline interpolation, if carried out in its natural Hilbert space W 2 2 [ a , b ] and on point sets with fill distance h , converges only like O ( h 2 ) in L 2 [ a , b ] if no additional assumptions are made. But superconvergence up to order h 4 occurs if more smoothness is assumed and if certain additional boundary conditions are satisfied. This phenomenon was generalized in 1999 to multivariate interpolation in Reproducing Kernel Hilbert Spaces on domains Ω ⊂ R d for continuous positive definite Fourier-transformable shift-invariant kernels on R d . But the sufficient condition for superconvergence given in 1999 still needs further analysis, because the interplay between smoothness and boundary conditions is not clear at all. Furthermore, if only additional smoothness is assumed, superconvergence is numerically observed in the interior of the domain, but a theoretical foundation still is a challenging open problem. This paper first generalizes the “improved error bounds” of 1999 by an abstract theory that includes the Aubin–Nitsche trick and the known superconvergence results for univariate polynomial splines. Then the paper analyzes what is behind the sufficient conditions for superconvergence. They split into conditions on smoothness and localization, and these are investigated independently. If sufficient smoothness is present, but no additional localization conditions are assumed, it is numerically observed that superconvergence always occurs in the interior of the domain, and some supporting arguments are provided. If smoothness and localization interact in the kernel-based case on R d , weak and strong boundary conditions in terms of pseudodifferential operators occur. A special section on Mercer expansions is added, because Mercer eigenfunctions always satisfy the sufficient conditions for superconvergence. Numerical examples illustrate the theoretical findings.

Published

2018

18. Conservation of a predator species in SIS prey-predator system using optimal taxation policy

Author

Nishant Juneja and Kulbhushan Agnihotri

Subjects

Hopf bifurcation, Equilibrium point, Biomass (ecology), education.field_of_study, General Mathematics, Applied Mathematics, Population, General Physics and Astronomy, Statistical and Nonlinear Physics, 01 natural sciences, 010305 fluids & plasmas, Predation, 010101 applied mathematics, symbols.namesake, 0103 physical sciences, symbols, Econometrics, Prey predator, 0101 mathematics, education, Predator, Bifurcation, Mathematics

Abstract

In this paper, we present and analyze a prey-predator system, in which prey species can be infected with some disease. The model presented in this paper is motivated from D. Mukherjee’s model in which he has considered an SI model for the prey species. There are substantial evidences that infected individuals have the ability to recover from the disease if vaccinated/ treated properly. In this regard, Mukherjee’s model is modified by considering SIS model for prey species. Theoretical and numerical simulations show that the recovery of infected prey species plays a crucial role in eliminating the limit cycle oscillations and thus making the interior equilibrium point stable. The possibility of Hopf bifurcation around non zero equilibrium point using the recovery rate as a bifurcation parameter, is discussed. Further, the model is extended by incorporating the harvesting of predator population. A monitory agency has been introduced which monitors the exploitation of resources by implementing certain taxes for each unit biomass of the predator population. The main purpose of the present research is to explore the effect of recovery rate of prey on the dynamics of the system and to optimize the total economical net profits from harvesting of predator species, taking taxation as control parameter.

Published

2018

19. Synchronized Chaos of a Three-Dimensional System with Quadratic Terms

Author

Ali Allahem

Subjects

Computer simulation, Phase portrait, Article Subject, General Mathematics, General Engineering, Chaotic, Lyapunov exponent, Bifurcation diagram, Engineering (General). Civil engineering (General), 01 natural sciences, Synchronization, 010101 applied mathematics, Nonlinear Sciences::Chaotic Dynamics, Nonlinear system, symbols.namesake, Quadratic equation, 0103 physical sciences, symbols, QA1-939, Applied mathematics, 0101 mathematics, TA1-2040, 010301 acoustics, Mathematics

Abstract

In this paper, a novel chaotic new three-dimensional system has been studied by Zhang et al. in 2012. In the system, there are three control parameters and three different nonlinear terms which governed equations. Zhang et al. studied elementary (preliminary) dynamic properties of the chaotic new three-dimensional system by means of bifurcation diagram, maximum Lyapunov exponent, phase portraits, dynamics behaviors by changing some parameters etc., using all possible theoretical analysis and numerical simulation. In this paper, we have demonstrated its complete synchronization. The proposed results are verified by numerical simulations.

Published

2020

20. A convergent adaptive finite element method for elliptic Dirichlet boundary control problems

Author

Zhiyu Tan, Ningning Yan, Wenbin Liu, and Wei Gong

Subjects

Applied Mathematics, General Mathematics, Estimator, Finite element approximations, 010103 numerical & computational mathematics, 01 natural sciences, Finite element method, Dirichlet distribution, 010101 applied mathematics, Computational Mathematics, symbols.namesake, Norm (mathematics), symbols, Partial derivative, Applied mathematics, A priori and a posteriori, 0101 mathematics, Mathematics

Abstract

This paper concerns the adaptive finite element method for elliptic Dirichlet boundary control problems in the energy space. The contribution of this paper is twofold. First, we rigorously derive efficient and reliable a posteriori error estimates for finite element approximations of Dirichlet boundary control problems. As a by-product, a priori error estimates are derived in a simple way by introducing appropriate auxiliary problems and establishing certain norm equivalence. Secondly, for the coupled elliptic partial differential system that resulted from the first-order optimality system, we prove that the sequence of adaptively generated discrete solutions including the control, the state and the adjoint state, guided by our newly derived a posteriori error indicators, converges to the true solution along with the convergence of the error estimators. We give some numerical results to confirm our theoretical findings.

Published

2018

21. 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

22. The formulation and analysis of energy-preserving schemes for solving high-dimensional nonlinear Klein–Gordon equations

Author

Xinyuan Wu and Bin Wang

Subjects

Applied Mathematics, General Mathematics, 010103 numerical & computational mathematics, High dimensional, 01 natural sciences, 010101 applied mathematics, Computational Mathematics, Nonlinear system, symbols.namesake, symbols, Applied mathematics, 0101 mathematics, Klein–Gordon equation, Energy (signal processing), Mathematics

Abstract

In this paper we focus on the analysis of energy-preserving schemes for solving high-dimensional nonlinear Klein–Gordon equations. A novel energy-preserving scheme is developed based on the discrete gradient method and the Duhamel principle. The local error, global convergence and nonlinear stability of the new scheme are analysed in detail. Numerical experiments are implemented to compare with existing numerical methods in the literature, and the numerical results show the remarkable efficiency of the new energy-preserving scheme presented in this paper.

Published

2018

23. Regularity of Maximum Distance Minimizers

Author

Yana Teplitskaya

Subjects

Statistics and Probability, Class (set theory), Applied Mathematics, General Mathematics, Pipeline (computing), 010102 general mathematics, 01 natural sciences, Steiner tree problem, 010101 applied mathematics, Set (abstract data type), Combinatorics, symbols.namesake, Compact space, Tangent lines to circles, symbols, Hausdorff measure, Point (geometry), 0101 mathematics, Mathematics

Abstract

We study properties of sets having the minimum length (one-dimensional Hausdorff measure) in the class of closed connected sets Σ ⊂ ℝ2 satisfying the inequality max yϵM dist (y, Σ) ≤ r for a given compact set M ⊂ ℝ2 and given r > 0. Such sets play the role of the shortest possible pipelines arriving at a distance at most r to every point of M where M is the set of customers of the pipeline. In this paper, it is announced that every maximum distance minimizer is a union of finitely many curves having one-sided tangent lines at every point. This shows that a maximum distance minimizer is isotopic to a finite Steiner tree even for a “bad” compact set M, which distinguishes it from a solution of the Steiner problem (an example of a Steiner tree with infinitely many branching points can be found in a paper by Paolini, Stepanov, and Teplitskaya). Moreover, the angle between these lines at each point of a maximum distance minimizer is at least 2π/3. Also, we classify the behavior of a minimizer Σ in a neighborhood of any point of Σ. In fact, all the results are proved for a more general class of local minimizers.

Published

2018

24. Redheffer type bounds for Bessel and modified Bessel functions of the first kind

Author

Árpád Baricz and Khaled Mehrez

Subjects

Discrete mathematics, Pure mathematics, Hankel transform, Cylindrical harmonics, Bessel process, Applied Mathematics, General Mathematics, 010102 general mathematics, Dirichlet eta function, 01 natural sciences, 010101 applied mathematics, symbols.namesake, Bessel polynomials, Struve function, symbols, Discrete Mathematics and Combinatorics, Bessel's inequality, 0101 mathematics, Bessel function, Mathematics

Abstract

In this paper our aim is to show some new inequalities of the Redheffer type for Bessel and modified Bessel functions of the first kind. The key tools in our proofs are some classical results on the monotonicity of quotients of differentiable functions as well as on the monotonicity of quotients of two power series. We also use some known results on the quotients of Bessel and modified Bessel functions of the first kind, and by using the monotonicity of the Dirichlet eta function we prove a sharp inequality for the tangent function. At the end of the paper a conjecture is stated, which may be of interest for further research.

Published

2018

25. Extended convergence of Gauss-Newton’s method and uniqueness of the solution

Author

Ioannis K. Argyros, Yeol Je Cho, and Santhosh George

Subjects

010101 applied mathematics, symbols.namesake, General Mathematics, 010102 general mathematics, Gauss, Convergence (routing), symbols, Applied mathematics, Uniqueness, 0101 mathematics, 01 natural sciences, Newton's method, Mathematics

Abstract

The aim of this paper is to extend the applicability of the Gauss-Newton’s method for solving nonlinear least squares problems using our new idea of restricted convergence domains. The new technique uses tighter Lipschitz functions than in earlier papers leading to a tighter ball convergence analysis.

Published

2018

26. Quenching phenomenon for a parabolic MEMS equation

Author

Qi Wang

Subjects

Microelectromechanical systems, Quenching, Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, Zero (complex analysis), Lambda, 01 natural sciences, 010101 applied mathematics, symbols.namesake, Dirichlet boundary condition, Bounded function, Domain (ring theory), symbols, Initial value problem, 0101 mathematics, Mathematics

Abstract

This paper deals with the electrostatic MEMS-device parabolic equation $${u_t} - \Delta u = \frac{{\lambda f(x)}}{{{{(1 - u)}^p}}}$$ in a bounded domain Ω of ℝ N , with Dirichlet boundary condition, an initial condition u0(x) ∈ [0, 1) and a nonnegative profile f, where λ > 0, p > 1. The study is motivated by a simplified micro-electromechanical system (MEMS for short) device model. In this paper, the author first gives an asymptotic behavior of the quenching time T* for the solution u to the parabolic problem with zero initial data. Secondly, the author investigates when the solution u will quench, with general λ, u0(x). Finally, a global existence in the MEMS modeling is shown.

Published

2018

27. Ill-posedness of the Prandtl equations in Sobolev spaces around a shear flow with general decay

Author

Cheng-Jie Liu and Tong Yang

Subjects

Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, Prandtl number, Mathematics::Analysis of PDEs, 01 natural sciences, Physics::Fluid Dynamics, 010101 applied mathematics, Sobolev space, symbols.namesake, Inviscid flow, symbols, 0101 mathematics, Exponential decay, Shear flow, Approximate solution, Ill posedness, Mathematics, Variable (mathematics)

Abstract

Motivated by the paper Gerard-Varet and Dormy (2010) [6] [JAMS, 2010] about the linear ill-posedness for the Prandtl equations around a shear flow with exponential decay in normal variable, and the recent study of well-posedness on the Prandtl equations in Sobolev spaces, this paper aims to extend the result in [6] to the case when the shear flow has general decay. The key observation is to construct an approximate solution that captures the initial layer to the linearized problem motivated by the precise formulation of solutions to the inviscid Prandtl equations.

Published

2017

28. A data assimilation process for linear ill-posed problems

Author

X.-M. Yang and Z.-L. Deng

Subjects

Well-posed problem, Mathematical optimization, General Mathematics, 010102 general mathematics, Bayesian probability, Posterior probability, General Engineering, Markov chain Monte Carlo, Inverse problem, 01 natural sciences, 010101 applied mathematics, symbols.namesake, Data assimilation, symbols, Applied mathematics, Ensemble Kalman filter, 0101 mathematics, Randomness, Mathematics

Abstract

In this paper, an iteration process is considered to solve linear ill-posed problems. Based on the randomness of the involved variables, this kind of problems is regarded as simulation problems of the posterior distribution of the unknown variable given the noise data. We construct a new ensemble Kalman filter-based method to seek the posterior target distribution. Despite the ensemble Kalman filter method having widespread applications, there has been little analysis of its theoretical properties, especially in the field of inverse problems. This paper analyzes the propagation of the error with the iteration step for the proposed algorithm. The theoretical analysis shows that the proposed algorithm is convergence. We compare the numerical effect with the Bayesian inversion approach by two numerical examples: backward heat conduction problem and the first kind of integral equation. The numerical tests show that the proposed algorithm is effective and competitive with the Bayesian method. Copyright © 2017 John Wiley & Sons, Ltd.

Published

2017

29. On the $$\mathbb {K}$$ K -Riemann integral and Hermite–Hadamard inequalities for $$\mathbb {K}$$ K -convex functions

Author

Andrzej Olbryś

Subjects

Mathematics(all), Pure mathematics, Hermite polynomials, Mathematics::Complex Variables, Generalization, Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, Riemann integral, 01 natural sciences, Convexity, 010101 applied mathematics, symbols.namesake, Hadamard transform, symbols, Discrete Mathematics and Combinatorics, 0101 mathematics, Convex function, Mathematics

Abstract

In the present paper we introduce a notion of the \(\mathbb {K}\)-Riemann integral as a natural generalization of a usual Riemann integral and study its properties. The aim of this paper is to extend the classical Hermite–Hadamard inequalities to the case when the usual Riemann integral is replaced by the \(\mathbb {K}\)-Riemann integral and the convexity notion is replaced by \(\mathbb {K}\)-convexity.

Published

2017

30. Infinite-Dimensional $$\ell ^1$$ ℓ 1 Minimization and Function Approximation from Pointwise Data

Author

Ben Adcock

Subjects

Pointwise, Truncation, General Mathematics, Numerical analysis, 010103 numerical & computational mathematics, Function (mathematics), 01 natural sciences, 010101 applied mathematics, Computational Mathematics, symbols.namesake, Function approximation, symbols, A priori and a posteriori, Jacobi polynomials, Applied mathematics, Minification, 0101 mathematics, Analysis, Mathematics

Abstract

We consider the problem of approximating a smooth function from finitely many pointwise samples using $$\ell ^1$$ minimization techniques. In the first part of this paper, we introduce an infinite-dimensional approach to this problem. Three advantages of this approach are as follows. First, it provides interpolatory approximations in the absence of noise. Second, it does not require a priori bounds on the expansion tail in order to be implemented. In particular, the truncation strategy we introduce as part of this framework is independent of the function being approximated, provided the function has sufficient regularity. Third, it allows one to explain the key role weights play in the minimization, namely, that of regularizing the problem and removing aliasing phenomena. In the second part of this paper, we present a worst-case error analysis for this approach. We provide a general recipe for analyzing this technique for arbitrary deterministic sets of points. Finally, we use this tool to show that weighted $$\ell ^1$$ minimization with Jacobi polynomials leads to an optimal method for approximating smooth, one-dimensional functions from scattered data.

Published

2017

31. Further investigation into split common fixed point problem for demicontractive operators

Author

Oluwatosin Temitope Mewomo and Yekini Shehu

Subjects

Mathematical optimization, Sequence, Iterative method, Applied Mathematics, General Mathematics, Computation, 010102 general mathematics, Hilbert space, 01 natural sciences, 010101 applied mathematics, symbols.namesake, Convergence (routing), symbols, Common fixed point, 0101 mathematics, Operator norm, Mathematics

Abstract

Our contribution in this paper is to propose an iterative algorithm which does not require prior knowledge of operator norm and prove strong convergence theorem for approximating a solution of split common fixed point problem of demicontractive mappings in a real Hilbert space. So many authors have used algorithms involving the operator norm for solving split common fixed point problem, but as widely known the computation of these algorithms may be difficult and for this reason, authors have recently started constructing iterative algorithms with a way of selecting the step-sizes such that the implementation of the algorithm does not require the calculation or estimation of the operator norm. We introduce a new algorithm for solving the split common fixed point problem for demicontractive mappings with a way of selecting the step-sizes such that the implementation of the algorithm does not require the calculation or estimation of the operator norm and then prove strong convergence of the sequence in real Hilbert spaces. Finally, we give some applications of our result and numerical example at the end of the paper.

Published

2016

32. Complex dynamics of an eco-epidemiological model with different competition coefficients and weak Allee in the predator

Author

Joydev Chattopadhyay, Md. Saifuddin, Sudip Samanta, Santanu Biswas, and Susmita Sarkar

Subjects

Equilibrium point, Hopf bifurcation, education.field_of_study, General Mathematics, Applied Mathematics, Population, Chaotic, General Physics and Astronomy, Statistical and Nonlinear Physics, Lyapunov exponent, 01 natural sciences, 010101 applied mathematics, symbols.namesake, Complex dynamics, Control theory, 0103 physical sciences, symbols, Quantitative Biology::Populations and Evolution, Carrying capacity, Statistical physics, 0101 mathematics, education, 010301 acoustics, Mathematics, Allee effect

Abstract

The paper explores an eco-epidemiological model with weak Allee in predator, and the disease in the prey population. We consider a predator-prey model with type II functional response. The curiosity of this paper is to consider different competition coefficients within the prey population, which leads to the emergent carrying capacity. We perform the local and global stability analysis of the equilibrium points and the Hopf bifurcation analysis around the endemic equilibrium point. Further we pay attention to the chaotic dynamics which is produced by disease. Our numerical simulations reveal that the three species eco-epidemiological system without weak-Allee induced chaos from stable focus for increasing the force of infection, whereas in the presence of the weak-Allee effect, it exhibits stable solution. We conclude that chaotic dynamics can be controlled by the Allee parameter as well as the competition coefficients. We apply basic tools of non-linear dynamics such as Poincare section and maximum Lyapunov exponent to identify chaotic behavior of the system.

Published

2016

33. Pointwise and uniform convergence of Fourier extensions

Author

Daan Huybrechs, Vincent Coppé, and Marcus Webb

Subjects

Computer Science::Machine Learning, Fourier extension, General Mathematics, Uniform convergence, 010103 numerical & computational mathematics, Computer Science::Digital Libraries, 01 natural sciences, Gibbs phenomenon, Statistics::Machine Learning, symbols.namesake, Lebesgue function, FOS: Mathematics, Applied mathematics, Mathematics - Numerical Analysis, 0101 mathematics, Fourier series, Mathematics, Pointwise, Pointwise convergence, 42A10, 41A17, 65T40, 42C15, constructive approximation, Cantor function, Numerical Analysis (math.NA), 010101 applied mathematics, Computational Mathematics, Fourier transform, Norm (mathematics), Computer Science::Mathematical Software, symbols, Legendre polynomials on a circular arc, Analysis

Abstract

Fourier series approximations of continuous but nonperiodic functions on an interval suffer the Gibbs phenomenon, which means there is a permanent oscillatory overshoot in the neighborhoods of the endpoints. Fourier extensions circumvent this issue by approximating the function using a Fourier series that is periodic on a larger interval. Previous results on the convergence of Fourier extensions have focused on the error in the $$L^2$$ L 2 norm, but in this paper we analyze pointwise and uniform convergence of Fourier extensions (formulated as the best approximation in the $$L^2$$ L 2 norm). We show that the pointwise convergence of Fourier extensions is more similar to Legendre series than classical Fourier series. In particular, unlike classical Fourier series, Fourier extensions yield pointwise convergence at the endpoints of the interval. Similar to Legendre series, pointwise convergence at the endpoints is slower by an algebraic order of a half compared to that in the interior. The proof is conducted by an analysis of the associated Lebesgue function, and Jackson- and Bernstein-type theorems for Fourier extensions. Numerical experiments are provided. We conclude the paper with open questions regarding the regularized and oversampled least squares interpolation versions of Fourier extensions.

Published

2018

34. 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

35. COMMON SOLUTION TO GENERALIZED MIXED EQUILIBRIUM PROBLEM AND FIXED POINT PROBLEM FOR A NONEXPANSIVE SEMIGROUP IN HILBERT SPACE

Author

Mohammad Farid, K. R. Kazmi, and Behzad Djafari-Rouhani

Subjects

Discrete mathematics, Sequence, Semigroup, Generalization, Iterative method, General Mathematics, 010102 general mathematics, Hilbert space, 01 natural sciences, 010101 applied mathematics, symbols.namesake, Fixed point problem, Scheme (mathematics), Variational inequality, symbols, Applied mathematics, 0101 mathematics, Mathematics

Abstract

In this paper, we introduce and study an explicit hybrid re- laxed extragradient iterative method to approximate a common solution to generalized mixed equilibrium problem and fixed point problem for a nonexpansive semigroup in Hilbert space. Further, we prove that the sequence generated by the proposed iterative scheme converges strongly to the common solution to generalized mixed equilibrium problem and fixed point problem for a nonexpansive semigroup. This common solu- tion is the unique solution of a variational inequality problem and is the optimality condition for a minimization problem. The results presented in this paper are the supplement, improvement and generalization of the previously known results in this area.

Published

2016

36. A Fast Relaxed Normal Two Split Method and an Effective Weighted TV Approach for Euler's Elastica Image Inpainting

Author

Maryam Yashtini and Sung Ha Kang

Subjects

Karush–Kuhn–Tucker conditions, Applied Mathematics, General Mathematics, Mathematical analysis, Inpainting, 02 engineering and technology, Curvature, 01 natural sciences, Backward Euler method, 010101 applied mathematics, symbols.namesake, Convergence (routing), 0202 electrical engineering, electronic engineering, information engineering, Euler's formula, symbols, Applied mathematics, 020201 artificial intelligence & image processing, 0101 mathematics, Gradient descent, Normal, Mathematics

Abstract

This paper proposes two numerical algorithms for solving Euler's elastica-based inpainting model. The minimizing functional is nonsmooth and nonconvex and involves high-order derivatives, that traditional gradient descent based methods converge very slowly. Recent alternating minimization methods show fast convergence when a good choice of parameters is used. The objective of this paper is to introduce efficient algorithms which have simple structures with fewer parameters. These methods are based on operator splitting and alternating direction method of multipliers, and subproblems can be solved efficiently by Fourier transforms and shrinkage operators. For the first method, we relax the normal vector in the curvature term of the Euler's elastica model and exploit two operator splitting techniques to propose a Relaxed Normal Two Split (RN2Split) method. The second method, $\kappa$-weighted Total Variation ($\kappa$TV), solves the Euler's elastica minimization problem as a weighted total variation. We pre...

Published

2016

37. 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

38. On existence of solutions of differential-difference equations

Author

Hai-chou Li

Subjects

Independent equation, General Mathematics, 010102 general mathematics, Mathematical analysis, General Engineering, 01 natural sciences, Euler equations, 010101 applied mathematics, Stochastic partial differential equation, Examples of differential equations, Theory of equations, symbols.namesake, Simultaneous equations, symbols, Applied mathematics, 0101 mathematics, C0-semigroup, Differential algebraic equation, Mathematics

Abstract

This paper applies Nevanlinna theory of value distribution to discuss existence of solutions of certain types of non-linear differential-difference equations such as (5) and (8) given in the succeeding paragraphs. Existence of solutions of differential equations and difference equations can be said to have been well studied, that of differential-difference equations, on the other hand, have been paid little attention. Such mixed type equations have great significance in applications. This paper, in particular, generalizes the Rellich–Wittich-type theorem and Malmquist-type theorem about differential equations to the case of differential-difference equations. Copyright © 2015 John Wiley & Sons, Ltd.

Published

2015

39. Existence of nontrivial solution for Schrödinger–Poisson systems with indefinite steep potential well

Author

Juntao Sun, Yuanze Wu, and Tsung-fang Wu

Subjects

Discrete mathematics, Applied Mathematics, General Mathematics, 010102 general mathematics, General Physics and Astronomy, Lambda, Poisson distribution, 01 natural sciences, Omega, 010101 applied mathematics, symbols.namesake, symbols, 0101 mathematics, Schrödinger's cat, Mathematics

Abstract

In this paper, we study a class of nonlinear Schrodinger–Poisson systems with indefinite steep potential well: $$\begin{aligned} \left\{ \begin{array}{l@{\quad }l} -\Delta u+V_{\lambda }(x)u+K(x)\phi u=|u|^{p-2}u &{} \text { in }\mathbb {R}^{3},\\ -\Delta \phi =K\left( x\right) u^{2} &{} \ \text {in }\mathbb {R}^{3}, \end{array} \right. \end{aligned}$$ where $$30$$ and $$ K(x)\ge 0$$ for all $$x\in \mathbb {R}^{3}$$ . We require that $$a\in C( \mathbb {R}^{3}) $$ is nonnegative and has a potential well $$\Omega _{a}$$ , namely $$a(x)\equiv 0$$ for $$x\in \Omega _{a}$$ and $$a(x)>0$$ for $$x\in \mathbb {R}^{3}\setminus \overline{\Omega _{a}}$$ . Unlike most other papers on this problem, we allow that $$b\in C(\mathbb {R}^{3}) $$ is unbounded below and sign-changing. By introducing some new hypotheses on the potentials and applying the method of penalized functions, we obtain the existence of nontrivial solutions for $$\lambda $$ sufficiently large. Furthermore, the concentration behavior of the nontrivial solution is also described as $$\lambda \rightarrow \infty $$ .

Published

2017

40. Plane wave formulas for spherical, complex and symplectic harmonics

Author

Hendrik De Bie, Franciscus Sommen, and Michael Wutzig

Subjects

Pizzetti formulas, General Mathematics, Stiefel manifolds, Zonal spherical harmonics, Symplectic harmonics, Plane waves, 01 natural sciences, Reproducing kernels, symbols.namesake, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Vector spherical harmonics, 0101 mathematics, Spherical harmonics, Mathematics, Solid harmonics, Numerical Analysis, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Table of spherical harmonics, 010101 applied mathematics, Mathematics and Statistics, 32A50, 42B35, Mathematics - Classical Analysis and ODEs, Harmonics, Spin-weighted spherical harmonics, symbols, Jacobi polynomials, Analysis

Abstract

This paper is concerned with spherical harmonics, and two refinements thereof: complex harmonics and symplectic harmonics. The reproducing kernels of the spherical and complex harmonics are explicitly given in terms of Gegenbauer or Jacobi polynomials. In the first part of the paper we determine the reproducing kernel for the space of symplectic harmonics, which is again expressible as a Jacobi polynomial of a suitable argument. In the second part we find plane wave formulas for the reproducing kernels of the three types of harmonics, expressing them as suitable integrals over Stiefel manifolds. This is achieved using Pizzetti formulas that express the integrals in terms of differential operators.

Published

2017

41. Convergence rate estimates for Trotter product approximations of solution operators for non-autonomous Cauchy problems

Author

Artur Stephan, Hagen Neidhardt, Valentin A. Zagrebnov, Weierstraß-Institut für Angewandte Analysis und Stochastik = Weierstrass Institute for Applied Analysis and Stochastics [Berlin] (WIAS), Forschungsverbund Berlin e.V. (FVB) (FVB), Humboldt University Of Berlin, Institut de Mathématiques de Marseille (I2M), Aix Marseille Université (AMU)-École Centrale de Marseille (ECM)-Centre National de la Recherche Scientifique (CNRS), and Humboldt-Universität zu Berlin

Subjects

extension theory, General Mathematics, Trotter product approximation, Banach space, Trotter product formula, [MATH.MATH-FA]Mathematics [math]/Functional Analysis [math.FA], 01 natural sciences, Separable space, symbols.namesake, convergence rate, 34G10, 47D06, 34K30, 47A55, solution operator, FOS: Mathematics, Applied mathematics, solution operators (propagators), 47D06, 0101 mathematics, approximation, Mathematics, perturbation theory, Cauchy problem, evolution equations, 010102 general mathematics, Hilbert space, Cauchy distribution, Propagator, 34G10, operator-norm convergence, 34K30, Functional Analysis (math.FA), Mathematics - Functional Analysis, 010101 applied mathematics, Rate of convergence, Product (mathematics), 34G10, 47D06, 34K30 (Primary), 47A55 (Secondary), symbols, non-autonomous Cauchy problem, operator splitting

Abstract

In the present paper we advocate the Howland-Evans approach to solution of the abstract non-autonomous Cauchy problem (non-ACP) in a separable Banach space X. The main idea is to reformulate this problem as an autonomous Cauchy problem (ACP) in a new Banach space L^p(I,X), consisting of X-valued functions on the time-interval I. The fundamental observation is a one-to-one correspondence between solution operators (propagators) for a non-ACP and the corresponding evolution semigroups for ACP in L^p(I,X). We show that the latter also allows to apply a full power of the operator-theoretical methods to scrutinise the non-ACP including the proof of the Trotter product approximation formulae with operator-norm estimate of the rate of convergence. The paper extends and improves some recent results in this direction in particular for Hilbert spaces., Comment: 40 pages

Published

2016

42. Exact and Inexact Subsampled Newton Methods for Optimization

Author

Richard H. Byrd, Raghu Bollapragada, and Jorge Nocedal

Subjects

Hessian matrix, FOS: Computer and information sciences, Applied Mathematics, General Mathematics, Linear system, ComputingMethodologies_IMAGEPROCESSINGANDCOMPUTERVISION, MathematicsofComputing_NUMERICALANALYSIS, Machine Learning (stat.ML), 010103 numerical & computational mathematics, 01 natural sciences, 010101 applied mathematics, Computational Mathematics, symbols.namesake, Rate of convergence, Optimization and Control (math.OC), Statistics - Machine Learning, Conjugate gradient method, symbols, FOS: Mathematics, Applied mathematics, Stochastic optimization, 0101 mathematics, Newton's method, Mathematics - Optimization and Control, Mathematics

Abstract

The paper studies the solution of stochastic optimization problems in which approximations to the gradient and Hessian are obtained through subsampling. We first consider Newton-like methods that employ these approximations and discuss how to coordinate the accuracy in the gradient and Hessian to yield a superlinear rate of convergence in expectation. The second part of the paper analyzes an inexact Newton method that solves linear systems approximately using the conjugate gradient (CG) method, and that samples the Hessian and not the gradient (the gradient is assumed to be exact). We provide a complexity analysis for this method based on the properties of the CG iteration and the quality of the Hessian approximation, and compare it with a method that employs a stochastic gradient iteration instead of the CG method. We report preliminary numerical results that illustrate the performance of inexact subsampled Newton methods on machine learning applications based on logistic regression., 37 pages

Published

2016

43. Global smooth flows for compressible Navier–Stokes–Maxwell equations

Author

Jiang Xu and Hongmei Cao

Subjects

Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, General Physics and Astronomy, Type (model theory), 01 natural sciences, 010101 applied mathematics, Combinatorics, symbols.namesake, Maxwell's equations, Compressibility, symbols, Dissipative system, Initial value problem, Navier stokes, 0101 mathematics, Mathematics

Abstract

Umeda et al. (Jpn J Appl Math 1:435–457, 1984) considered a rather general class of symmetric hyperbolic–parabolic systems: $$A^{0}z_{t}+\sum_{j=1}^{n}A^{j}z_{x_{j}}+Lz=\sum_{j,k=1}^{n}B^{jk}z_{x_{j}x_{k}}$$ and showed optimal decay rates with certain dissipative assumptions. In their results, the dissipation matrices $${L}$$ and $${B^{jk}(j,k=1,\ldots,n)}$$ are both assumed to be real symmetric. So far there are no general results in case that $${L}$$ and $${B^{jk}}$$ are not necessarily symmetric, which is left open now. In this paper, we investigate compressible Navier–Stokes–Maxwell (N–S–M) equations arising in plasmas physics, which is a concrete example of hyperbolic–parabolic composite systems with non-symmetric dissipation. It is observed that the Cauchy problem for N–S–M equations admits the dissipative mechanism of regularity-loss type. Consequently, extra higher regularity is usually needed to obtain the optimal decay rate of $${L^{1}({\mathbb{R}}^3)}$$ - $${L^2({\mathbb{R}}^3)}$$ type, in comparison with that for the global-in-time existence of smooth solutions. In this paper, we obtain the minimal decay regularity of global smooth solutions to N–S–M equations, with aid of $${L^p({\mathbb{R}}^n)}$$ - $${L^{q}({\mathbb{R}}^n)}$$ - $${L^{r}({\mathbb{R}}^n)}$$ estimates. It is worth noting that the relation between decay derivative orders and the regularity index of initial data is firstly found in the optimal decay estimates.

Published

2016

44. STOCHASTIC STABILITY OF VECTOR SDE WITH APPLICATIONS TO A STOCHASTIC EPIDEMIC MODEL

Author

Mariya Svishchuk, Anatoliy Swishchuk, and Nikolaos Limnios

Subjects

Lyapunov function, Continuous-time stochastic process, Mathematical optimization, Applied Mathematics, General Mathematics, 01 natural sciences, Stability (probability), Exponential function, 010101 applied mathematics, symbols.namesake, Stochastic differential equation, Exponential stability, symbols, Quantitative Biology::Populations and Evolution, Applied mathematics, Stochastic optimization, 0101 mathematics, Epidemic model, Mathematics

Abstract

In this paper we consider stochastic stability, namely, asymptotic stability in mean, asymptotic mean-square stability, asymptotic stability a.s., exponential p-stability and stability with stochastic Lyapunov fucntion for vector stochastic differential equations. We apply these results to the stochastic epidemic models induced by bacteriophages in the marine bacteria populations. The novelty of the paper consists of new stability results for vector SDE and their applications to a new stochastic epidemic model.

Published

2016

45. A Variational Model for Joint Motion Estimation and Image Reconstruction

Author

Martin Burger, Carola-Bibiane Schönlieb, Hendrik Dirks, and Apollo - University of Cambridge Repository

Subjects

FOS: Computer and information sciences, Function space, image denoising, 68U10, 65K10, 65M06, General Mathematics, Computer Vision and Pattern Recognition (cs.CV), Computer Science - Computer Vision and Pattern Recognition, ComputingMethodologies_IMAGEPROCESSINGANDCOMPUTERVISION, Motion (geometry), 02 engineering and technology, Iterative reconstruction, 01 natural sciences, Regularization (mathematics), Image (mathematics), motion estimation, symbols.namesake, Motion estimation, 0202 electrical engineering, electronic engineering, information engineering, FOS: Mathematics, Mathematics - Numerical Analysis, 0101 mathematics, joint variational model, dynamic image reconstruction, Mathematics - Optimization and Control, Mathematics, Applied Mathematics, Mathematical analysis, Eulerian path, Numerical Analysis (math.NA), 010101 applied mathematics, regularization, Motion field, Optimization and Control (math.OC), symbols, 020201 artificial intelligence & image processing, Algorithm, Eulerian motion model

Abstract

The aim of this paper is to derive and analyze a variational model for the joint estimation of motion and reconstruction of image sequences, which is based on a time-continuous Eulerian motion model. The model can be set up in terms of the continuity equation or the brightness constancy equation. The analysis in this paper focuses on the latter for robust motion estimation on sequences of twodimensional images. We rigorously prove the existence of a minimizer in a suitable function space setting. Moreover, we discuss the numerical solution of the model based on primal-dual algorithms and investigate several examples. Finally, the benefits of our model compared to existing techniques, such as sequential image reconstruction and motion estimation, are shown., The work of the first author was also supported by the German Science Foundation DFG via EXC 1003 Cells in Motion Cluster of Excellence, M¨unster, Germany

Published

2016

46. On the zeros of Dirichlet -functions

Author

Raouf Ouni, Kamel Mazhouda, and Sami Omar

Subjects

Mathematical society, General Mathematics, 010103 numerical & computational mathematics, 01 natural sciences, Dirichlet distribution, 010101 applied mathematics, Riemann hypothesis, symbols.namesake, Number theory, Computational Theory and Mathematics, symbols, Applied mathematics, 0101 mathematics, Mathematics

Abstract

This paper [1], which was published online on 1 June 2011, has been retracted by agreement between the authors, the journal’s Editor-in-Chief Derek Holt, the London Mathematical Society and Cambridge University Press. The retraction was agreed to prevent other authors from using incorrect mathematical results. (In this paper, we compute and verify the positivity of the Li coefficients for the Dirichlet $L$-functions using an arithmetic formula established in Omar and Mazhouda, J. Number Theory 125 (2007) no. 1, 50–58; J. Number Theory 130 (2010) no. 4, 1109–1114. Furthermore, we formulate a criterion for the partial Riemann hypothesis and we provide some numerical evidence for it using new formulas for the Li coefficients.)

Published

2011

47. On the Asymptotic Analysis of Problems Involving Fractional Laplacian in Cylindrical Domains Tending to Infinity

Author

Prosenjit Roy and Indranil Chowdhury

Subjects

35B40, 35R09, Work (thermodynamics), Asymptotic analysis, Applied Mathematics, General Mathematics, media_common.quotation_subject, 010102 general mathematics, Infinity, 01 natural sciences, Dirichlet distribution, 010101 applied mathematics, symbols.namesake, Mathematics - Analysis of PDEs, FOS: Mathematics, symbols, Order (group theory), Applied mathematics, 0101 mathematics, Fractional Laplacian, Analysis of PDEs (math.AP), media_common, Mathematics

Abstract

The paper is an attempt to investigate the issues of asymptotic analysis for problems involving fractional Laplacian where the domains tend to become unbounded in one-direction. Motivated from the pioneering work on second-order elliptic problems by Chipot and Rougirel in [On the asymptotic behaviour of the solution of elliptic problems in cylindrical domains becoming unbounded, Commun. Contemp. Math. 4(1) (2002) 15–44], where the force functions are considered on the cross-section of domains, we prove the non-local counterpart of their result.Recently in [Asymptotic behavior of elliptic nonlocal equations set in cylinders, Asymptot. Anal. 89(1–2) (2014) 21–35] Yeressian established a weighted estimate for solutions of non-local Dirichlet problems which exhibit the asymptotic behavior. The case when [Formula: see text] was also treated as an example to show how the weighted estimate might be used to achieve the asymptotic behavior. In this paper, we extend this result to each order between [Formula: see text] and [Formula: see text].

Published

2015

48. 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

49. Observations on the vanishing viscosity limit

Author

James P. Kelliher

Subjects

Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Boundary (topology), 76D05, 76B99, 76D10, Vorticity, 01 natural sciences, Euler equations, 010101 applied mathematics, Physics::Fluid Dynamics, Viscosity, Boundary layer, symbols.namesake, Mathematics - Analysis of PDEs, Rate of convergence, Vortex sheet, symbols, FOS: Mathematics, Boundary value problem, 0101 mathematics, Mathematics, Analysis of PDEs (math.AP)

Abstract

Whether, in the presence of a boundary, solutions of the Navier-Stokes equations converge to a solution to the Euler equations in the vanishing viscosity limit is unknown. In a seminal 1983 paper, Tosio Kato showed that the vanishing viscosity limit is equivalent to having sufficient control of the gradient of the Navier-Stokes velocity in a boundary layer of width proportional to the viscosity. In a 2008 paper, the present author showed that the vanishing viscosity limit is equivalent to the formation of a vortex sheet on the boundary. We present here several observations that follow on from these two papers. Compiled on Sunday 20 March 2016 1. Definitions and past results 3 2. A 3D version of vorticity accumulation on the boundary 6 3. L-norms of the vorticity blow up for p > 1 7 4. Improved convergence when vorticity bounded in L 8 5. Some kind of convergence always happens 9 6. Width of the boundary layer: 2D 10 7. Optimal convergence rate: 2D 12 8. A condition on the boundary equivalent to (V V ): 2D 14 9. Examples where condition on the boundary holds: 2D 17 10. On a result of Bardos and Titi: 2D 22 Appendix A. A Trace Lemma 23 Acknowledgements 25 References 26 The Navier-Stokes equations for a viscous incompressible fluid in a domain Ω ⊆ Rd, d ≥ 2, with no-slip boundary conditions can be written, (NS)  ∂tu+ u · ∇u+∇p = ν∆u+ f in Ω, div u = 0 in Ω, u = 0 on Γ := ∂Ω. Date: (compiled on Sunday 20 March 2016). 2010 Mathematics Subject Classification. Primary 76D05, 76B99, 76D10.

Published

2014

50. Boundary stabilization of a 3-dimensional structural acoustic model

Author

Irena Lasiecka

Subjects

Mathematics(all), Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, Boundary (topology), Wave equation, 01 natural sciences, uniform decay rates, Euler equations, nonlinear dissipation, 010101 applied mathematics, Nonlinear system, Bernoulli's principle, symbols.namesake, trace estimates, Free boundary problem, symbols, Acoustic wave equation, wave equation, plate equation, 0101 mathematics, Structural acoustics, structural acoustic model, Mathematics

Abstract

The main result of this paper provides uniform decay rates obtained for the energy function associated with a three-dimensional structural acoustic model described by coupled system consisting of the wave equation and plate equation with the coupling on the interface between the acoustic chamber and the wall. The uniform stabilization is achieved by introducing a nonlinear dissipation acting via boundary forces applied at the edge of the plate and viscous or boundary damping applied to the wave equation. The results obtained in this paper extend, to the non-analytic, hyperbolic-like setting, the results obtained previously in the literature for acoustic problems modeled by structurally damped plates (governed by analytic semigroups). As a bypass product, we also obtain optimal uniform decay rates for the Euler Bernoulli plate equations with nonlinear boundary dissipation acting via shear forces only and without (i) any geometric conditions imposed on the domain ,(ii) any growth conditions at the origin imposed on the nonlinear function. This is in contrast with the results obtained previously in the literature ([22] and references therein).

Published

1999